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	<h1 id="top">
	Iozone results for fwrite, data are arranged by file size
	</h1>
	<DL class="filelist"><DT><STRONG>Baseline data set</STRONG><UL><LI>./ext4/ext4_1.iozone<LI>./ext4/ext4_2.iozone<LI>./ext4/ext4_3.iozone<LI>./ext4/ext4_4.iozone<LI>./ext4/ext4_5.iozone</UL><DT><STRONG>Investigated data set</STRONG><UL><LI>./xfs/xfs1.iozone<LI>./xfs/xfs2.iozone<LI>./xfs/xfs3.iozone<LI>./xfs/xfs4.iozone<LI>./xfs/xfs5.iozone</UL></DL><p>mean => Arithmetic mean<br>standar dev. => Sample standard deviation<br>ci. max 90%, ci.min => confidence interval at confidence level 90% => it means that mean value of the distribution lies with 90% propability in interval ci_min-ci_max<br>geom. mean => Geometric mean<br>median => Second quartile = cuts data set in half = 50th percentile <br>first quartile => cuts off lowest 25% of data = 25th percentile <br>third quartile => cuts off highest 25% of data, or lowest 75% = 75th percentile <br>minimum => Lowest value of data set <br>maximum => Hightest value of data set <br>baseline set1 difference => Difference of medians of both sets in percennt. Arithmetic means are used in detail mode instead.<br>ttest p-value => Student's t-test p-value = probability the both data sets are equal <br>ttest equality => If p-value is higher than 0.1, data sets are considered being equal with 90% probability. Otherwise the data sets are considered being different.<br>Linear regression of all results regression line is in y = ax form, b coeficient is zero. </p><p>for details about operations performed see <a href="http://www.iozone.org/docs/IOzone_msword_98.pdf">Iozone documentation</a></p><a name="4"></a> 
<img src="4.png" alt="4" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="1">Block size [kB]</td>
</tr>
<tr><td>4</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>4</td><td>216.13</td></tr>
<tr><td>4</td><td>178.46</td></tr>
<tr><td>4</td><td>245.25</td></tr>
<tr><td>4</td><td>228.17</td></tr>
<tr><td>4</td><td>260.87</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>225.78</td>
</tr>
<tr>
<td>standard dev.</td>
<td>31.42</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>195.82</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>255.73</td>
</tr>
<tr>
<td>geom. mean</td>
<td>223.93</td>
</tr>
<tr>
<td>median</td>
<td>228.17</td>
</tr>
<tr>
<td>first quartile</td>
<td>216.13</td>
</tr>
<tr>
<td>third quartile</td>
<td>245.25</td>
</tr>
<tr>
<td>minimum</td>
<td>178.46</td>
</tr>
<tr>
<td>maximum</td>
<td>260.87</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>4</td><td>304.5</td></tr>
<tr><td>4</td><td>298.95</td></tr>
<tr><td>4</td><td>278.61</td></tr>
<tr><td>4</td><td>278.61</td></tr>
<tr><td>4</td><td>278.61</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>287.86</td>
</tr>
<tr>
<td>standard dev.</td>
<td>12.81</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>275.64</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>300.07</td>
</tr>
<tr>
<td>geom. mean</td>
<td>287.63</td>
</tr>
<tr>
<td>median</td>
<td>278.61</td>
</tr>
<tr>
<td>first quartile</td>
<td>278.61</td>
</tr>
<tr>
<td>third quartile</td>
<td>298.95</td>
</tr>
<tr>
<td>minimum</td>
<td>278.61</td>
</tr>
<tr>
<td>maximum</td>
<td>304.5</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>27.5 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0035</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
</tr>
</table>
<a name="8"></a> 
<img src="8.png" alt="8" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="2">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>8</td><td>521.74</td><td>456.34</td></tr>
<tr><td>8</td><td>373.19</td><td>410.6</td></tr>
<tr><td>8</td><td>483.26</td><td>438.04</td></tr>
<tr><td>8</td><td>456.34</td><td>301.16</td></tr>
<tr><td>8</td><td>456.34</td><td>456.34</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>458.17</td>
<td>412.5</td>
</tr>
<tr>
<td>standard dev.</td>
<td>54.54</td>
<td>64.99</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>406.17</td>
<td>350.53</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>510.17</td>
<td>474.46</td>
</tr>
<tr>
<td>geom. mean</td>
<td>455.44</td>
<td>407.81</td>
</tr>
<tr>
<td>median</td>
<td>456.34</td>
<td>438.04</td>
</tr>
<tr>
<td>first quartile</td>
<td>456.34</td>
<td>410.6</td>
</tr>
<tr>
<td>third quartile</td>
<td>483.26</td>
<td>456.34</td>
</tr>
<tr>
<td>minimum</td>
<td>373.19</td>
<td>301.16</td>
</tr>
<tr>
<td>maximum</td>
<td>521.74</td>
<td>456.34</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>8</td><td>557.22</td><td>456.34</td></tr>
<tr><td>8</td><td>521.74</td><td>462.79</td></tr>
<tr><td>8</td><td>490.5</td><td>456.34</td></tr>
<tr><td>8</td><td>391.0</td><td>490.5</td></tr>
<tr><td>8</td><td>521.74</td><td>432.26</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>496.44</td>
<td>459.65</td>
</tr>
<tr>
<td>standard dev.</td>
<td>63.5</td>
<td>20.82</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>435.9</td>
<td>439.8</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>556.98</td>
<td>479.49</td>
</tr>
<tr>
<td>geom. mean</td>
<td>492.89</td>
<td>459.27</td>
</tr>
<tr>
<td>median</td>
<td>521.74</td>
<td>456.34</td>
</tr>
<tr>
<td>first quartile</td>
<td>490.5</td>
<td>456.34</td>
</tr>
<tr>
<td>third quartile</td>
<td>521.74</td>
<td>462.79</td>
</tr>
<tr>
<td>minimum</td>
<td>391.0</td>
<td>432.26</td>
</tr>
<tr>
<td>maximum</td>
<td>557.22</td>
<td>490.5</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>8.35 % </td>
<td>11.43 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.3366</td>
<td>0.161</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
</tr>
</table>
<a name="16"></a> 
<img src="16.png" alt="16" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="3">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>16</td><td>556.31</td><td>746.38</td><td>684.05</td></tr>
<tr><td>16</td><td>423.34</td><td>676.98</td><td>625.31</td></tr>
<tr><td>16</td><td>556.31</td><td>676.98</td><td>713.86</td></tr>
<tr><td>16</td><td>381.45</td><td>520.93</td><td>625.31</td></tr>
<tr><td>16</td><td>412.68</td><td>684.05</td><td>501.02</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>466.02</td>
<td>661.06</td>
<td>629.91</td>
</tr>
<tr>
<td>standard dev.</td>
<td>83.85</td>
<td>83.59</td>
<td>81.6</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>386.08</td>
<td>581.37</td>
<td>552.11</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>545.96</td>
<td>740.76</td>
<td>707.7</td>
</tr>
<tr>
<td>geom. mean</td>
<td>460.12</td>
<td>656.44</td>
<td>625.39</td>
</tr>
<tr>
<td>median</td>
<td>423.34</td>
<td>676.98</td>
<td>625.31</td>
</tr>
<tr>
<td>first quartile</td>
<td>412.68</td>
<td>676.98</td>
<td>625.31</td>
</tr>
<tr>
<td>third quartile</td>
<td>556.31</td>
<td>684.05</td>
<td>684.05</td>
</tr>
<tr>
<td>minimum</td>
<td>381.45</td>
<td>520.93</td>
<td>501.02</td>
</tr>
<tr>
<td>maximum</td>
<td>556.31</td>
<td>746.38</td>
<td>713.86</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>16</td><td>650.12</td><td>782.0</td><td>746.38</td></tr>
<tr><td>16</td><td>602.32</td><td>746.38</td><td>676.98</td></tr>
<tr><td>16</td><td>602.32</td><td>706.16</td><td>713.86</td></tr>
<tr><td>16</td><td>602.32</td><td>706.16</td><td>746.38</td></tr>
<tr><td>16</td><td>625.31</td><td>746.38</td><td>713.86</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>616.48</td>
<td>737.42</td>
<td>719.49</td>
</tr>
<tr>
<td>standard dev.</td>
<td>21.28</td>
<td>32.02</td>
<td>28.79</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>596.19</td>
<td>706.89</td>
<td>692.04</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>636.77</td>
<td>767.94</td>
<td>746.94</td>
</tr>
<tr>
<td>geom. mean</td>
<td>616.19</td>
<td>736.86</td>
<td>719.02</td>
</tr>
<tr>
<td>median</td>
<td>602.32</td>
<td>746.38</td>
<td>713.86</td>
</tr>
<tr>
<td>first quartile</td>
<td>602.32</td>
<td>706.16</td>
<td>713.86</td>
</tr>
<tr>
<td>third quartile</td>
<td>625.31</td>
<td>746.38</td>
<td>746.38</td>
</tr>
<tr>
<td>minimum</td>
<td>602.32</td>
<td>706.16</td>
<td>676.98</td>
</tr>
<tr>
<td>maximum</td>
<td>650.12</td>
<td>782.0</td>
<td>746.38</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>32.29 % </td>
<td>11.55 % </td>
<td>14.22 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0046</td>
<td>0.0929</td>
<td>0.0493</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="32"></a> 
<img src="32.png" alt="32" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="4">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>32</td><td>694.22</td><td>762.91</td><td>917.83</td><td>892.83</td></tr>
<tr><td>32</td><td>452.28</td><td>528.93</td><td>924.31</td><td>187.03</td></tr>
<tr><td>32</td><td>676.31</td><td>800.17</td><td>979.57</td><td>820.2</td></tr>
<tr><td>32</td><td>432.86</td><td>762.91</td><td>869.14</td><td>825.36</td></tr>
<tr><td>32</td><td>649.5</td><td>762.91</td><td>972.3</td><td>869.14</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>581.03</td>
<td>723.56</td>
<td>932.63</td>
<td>718.91</td>
</tr>
<tr>
<td>standard dev.</td>
<td>127.58</td>
<td>109.99</td>
<td>44.99</td>
<td>298.87</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>459.39</td>
<td>618.7</td>
<td>889.74</td>
<td>433.97</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>702.67</td>
<td>828.43</td>
<td>975.52</td>
<td>1003.86</td>
</tr>
<tr>
<td>geom. mean</td>
<td>569.11</td>
<td>715.81</td>
<td>931.76</td>
<td>628.73</td>
</tr>
<tr>
<td>median</td>
<td>649.5</td>
<td>762.91</td>
<td>924.31</td>
<td>825.36</td>
</tr>
<tr>
<td>first quartile</td>
<td>452.28</td>
<td>762.91</td>
<td>917.83</td>
<td>820.2</td>
</tr>
<tr>
<td>third quartile</td>
<td>676.31</td>
<td>762.91</td>
<td>972.3</td>
<td>869.14</td>
</tr>
<tr>
<td>minimum</td>
<td>432.86</td>
<td>528.93</td>
<td>869.14</td>
<td>187.03</td>
</tr>
<tr>
<td>maximum</td>
<td>694.22</td>
<td>800.17</td>
<td>979.57</td>
<td>892.83</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>32</td><td>758.49</td><td>892.83</td><td>1002.04</td><td>944.28</td></tr>
<tr><td>32</td><td>724.93</td><td>820.2</td><td>979.57</td><td>944.28</td></tr>
<tr><td>32</td><td>709.24</td><td>805.08</td><td>979.57</td><td>979.57</td></tr>
<tr><td>32</td><td>709.24</td><td>846.69</td><td>979.57</td><td>944.28</td></tr>
<tr><td>32</td><td>724.93</td><td>869.14</td><td>972.3</td><td>972.3</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>725.37</td>
<td>846.79</td>
<td>982.61</td>
<td>956.94</td>
</tr>
<tr>
<td>standard dev.</td>
<td>20.11</td>
<td>35.59</td>
<td>11.31</td>
<td>17.53</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>706.2</td>
<td>812.86</td>
<td>971.83</td>
<td>940.23</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>744.54</td>
<td>880.72</td>
<td>993.39</td>
<td>973.65</td>
</tr>
<tr>
<td>geom. mean</td>
<td>725.15</td>
<td>846.19</td>
<td>982.56</td>
<td>956.82</td>
</tr>
<tr>
<td>median</td>
<td>724.93</td>
<td>846.69</td>
<td>979.57</td>
<td>944.28</td>
</tr>
<tr>
<td>first quartile</td>
<td>709.24</td>
<td>820.2</td>
<td>979.57</td>
<td>944.28</td>
</tr>
<tr>
<td>third quartile</td>
<td>724.93</td>
<td>869.14</td>
<td>979.57</td>
<td>972.3</td>
</tr>
<tr>
<td>minimum</td>
<td>709.24</td>
<td>805.08</td>
<td>972.3</td>
<td>944.28</td>
</tr>
<tr>
<td>maximum</td>
<td>758.49</td>
<td>892.83</td>
<td>1002.04</td>
<td>979.57</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>24.84 % </td>
<td>17.03 % </td>
<td>5.36 % </td>
<td>33.11 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.037</td>
<td>0.0443</td>
<td>0.0426</td>
<td>0.1133</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>SAME</td>
</tr>
</table>
<a name="64"></a> 
<img src="64.png" alt="64" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="5">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>64</td><td>751.55</td><td>892.24</td><td>960.92</td><td>1155.81</td><td>1024.78</td></tr>
<tr><td>64</td><td>265.92</td><td>302.08</td><td>701.28</td><td>1116.43</td><td>993.7</td></tr>
<tr><td>64</td><td>762.48</td><td>822.27</td><td>960.92</td><td>1135.78</td><td>1009.0</td></tr>
<tr><td>64</td><td>726.55</td><td>652.41</td><td>917.21</td><td>917.21</td><td>282.85</td></tr>
<tr><td>64</td><td>762.48</td><td>868.58</td><td>917.21</td><td>1116.43</td><td>947.03</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>653.79</td>
<td>707.52</td>
<td>891.51</td>
<td>1088.33</td>
<td>851.47</td>
</tr>
<tr>
<td>standard dev.</td>
<td>217.33</td>
<td>245.28</td>
<td>108.56</td>
<td>97.04</td>
<td>319.2</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>446.6</td>
<td>473.67</td>
<td>788.01</td>
<td>995.82</td>
<td>547.15</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>860.99</td>
<td>941.36</td>
<td>995.01</td>
<td>1180.85</td>
<td>1155.79</td>
</tr>
<tr>
<td>geom. mean</td>
<td>609.94</td>
<td>660.37</td>
<td>885.61</td>
<td>1084.58</td>
<td>772.57</td>
</tr>
<tr>
<td>median</td>
<td>751.55</td>
<td>822.27</td>
<td>917.21</td>
<td>1116.43</td>
<td>993.7</td>
</tr>
<tr>
<td>first quartile</td>
<td>726.55</td>
<td>652.41</td>
<td>917.21</td>
<td>1116.43</td>
<td>947.03</td>
</tr>
<tr>
<td>third quartile</td>
<td>762.48</td>
<td>868.58</td>
<td>960.92</td>
<td>1135.78</td>
<td>1009.0</td>
</tr>
<tr>
<td>minimum</td>
<td>265.92</td>
<td>302.08</td>
<td>701.28</td>
<td>917.21</td>
<td>282.85</td>
</tr>
<tr>
<td>maximum</td>
<td>762.48</td>
<td>892.24</td>
<td>960.92</td>
<td>1155.81</td>
<td>1024.78</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>64</td><td>679.47</td><td>975.22</td><td>1075.22</td><td>1249.46</td><td>1203.57</td></tr>
<tr><td>64</td><td>822.27</td><td>975.22</td><td>1041.06</td><td>1220.38</td><td>1160.93</td></tr>
<tr><td>64</td><td>790.05</td><td>933.54</td><td>1041.06</td><td>1203.57</td><td>1135.78</td></tr>
<tr><td>64</td><td>822.27</td><td>960.92</td><td>1041.06</td><td>1226.08</td><td>1155.81</td></tr>
<tr><td>64</td><td>812.08</td><td>259.34</td><td>1079.64</td><td>1226.08</td><td>1135.78</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>785.23</td>
<td>820.85</td>
<td>1055.61</td>
<td>1225.11</td>
<td>1158.37</td>
</tr>
<tr>
<td>standard dev.</td>
<td>60.57</td>
<td>314.35</td>
<td>19.98</td>
<td>16.44</td>
<td>27.73</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>727.49</td>
<td>521.15</td>
<td>1036.55</td>
<td>1209.44</td>
<td>1131.93</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>842.97</td>
<td>1120.55</td>
<td>1074.66</td>
<td>1240.79</td>
<td>1184.81</td>
</tr>
<tr>
<td>geom. mean</td>
<td>783.23</td>
<td>739.57</td>
<td>1055.46</td>
<td>1225.03</td>
<td>1158.11</td>
</tr>
<tr>
<td>median</td>
<td>812.08</td>
<td>960.92</td>
<td>1041.06</td>
<td>1226.08</td>
<td>1155.81</td>
</tr>
<tr>
<td>first quartile</td>
<td>790.05</td>
<td>933.54</td>
<td>1041.06</td>
<td>1220.38</td>
<td>1135.78</td>
</tr>
<tr>
<td>third quartile</td>
<td>822.27</td>
<td>975.22</td>
<td>1075.22</td>
<td>1226.08</td>
<td>1160.93</td>
</tr>
<tr>
<td>minimum</td>
<td>679.47</td>
<td>259.34</td>
<td>1041.06</td>
<td>1203.57</td>
<td>1135.78</td>
</tr>
<tr>
<td>maximum</td>
<td>822.27</td>
<td>975.22</td>
<td>1079.64</td>
<td>1249.46</td>
<td>1203.57</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>20.1 % </td>
<td>16.02 % </td>
<td>18.41 % </td>
<td>12.57 % </td>
<td>36.04 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.2289</td>
<td>0.5428</td>
<td>0.0105</td>
<td>0.0145</td>
<td>0.0646</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="128"></a> 
<img src="128.png" alt="128" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="6">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>128</td><td>816.89</td><td>955.33</td><td>1040.65</td><td>1147.73</td><td>556.09</td><td>1168.18</td></tr>
<tr><td>128</td><td>806.84</td><td>938.23</td><td>687.31</td><td>499.89</td><td>1077.0</td><td>1077.0</td></tr>
<tr><td>128</td><td>425.28</td><td>946.7</td><td>999.01</td><td>1115.97</td><td>1288.79</td><td>1135.3</td></tr>
<tr><td>128</td><td>529.69</td><td>905.81</td><td>991.46</td><td>885.91</td><td>879.96</td><td>1051.09</td></tr>
<tr><td>128</td><td>781.58</td><td>595.24</td><td>1000.92</td><td>1104.22</td><td>991.46</td><td>885.91</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>672.06</td>
<td>868.26</td>
<td>943.87</td>
<td>950.74</td>
<td>958.66</td>
<td>1063.5</td>
</tr>
<tr>
<td>standard dev.</td>
<td>181.87</td>
<td>153.77</td>
<td>144.7</td>
<td>272.55</td>
<td>270.33</td>
<td>109.53</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>498.66</td>
<td>721.66</td>
<td>805.92</td>
<td>690.9</td>
<td>700.93</td>
<td>959.07</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>845.45</td>
<td>1014.86</td>
<td>1081.82</td>
<td>1210.59</td>
<td>1216.39</td>
<td>1167.92</td>
</tr>
<tr>
<td>geom. mean</td>
<td>650.02</td>
<td>855.22</td>
<td>933.56</td>
<td>910.67</td>
<td>923.97</td>
<td>1058.7</td>
</tr>
<tr>
<td>median</td>
<td>781.58</td>
<td>938.23</td>
<td>999.01</td>
<td>1104.22</td>
<td>991.46</td>
<td>1077.0</td>
</tr>
<tr>
<td>first quartile</td>
<td>529.69</td>
<td>905.81</td>
<td>991.46</td>
<td>885.91</td>
<td>879.96</td>
<td>1051.09</td>
</tr>
<tr>
<td>third quartile</td>
<td>806.84</td>
<td>946.7</td>
<td>1000.92</td>
<td>1115.97</td>
<td>1077.0</td>
<td>1135.3</td>
</tr>
<tr>
<td>minimum</td>
<td>425.28</td>
<td>595.24</td>
<td>687.31</td>
<td>499.89</td>
<td>556.09</td>
<td>885.91</td>
</tr>
<tr>
<td>maximum</td>
<td>816.89</td>
<td>955.33</td>
<td>1040.65</td>
<td>1147.73</td>
<td>1288.79</td>
<td>1168.18</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>128</td><td>868.31</td><td>1051.09</td><td>1115.97</td><td>1237.09</td><td>1453.1</td><td>1248.88</td></tr>
<tr><td>128</td><td>868.31</td><td>1026.39</td><td>1077.0</td><td>503.73</td><td>1402.57</td><td>1260.9</td></tr>
<tr><td>128</td><td>844.53</td><td>360.38</td><td>1106.55</td><td>1189.38</td><td>1402.57</td><td>1237.09</td></tr>
<tr><td>128</td><td>444.76</td><td>1000.92</td><td>1106.55</td><td>541.17</td><td>1387.72</td><td>1248.88</td></tr>
<tr><td>128</td><td>801.9</td><td>1008.62</td><td>1106.55</td><td>1225.53</td><td>1421.58</td><td>1288.79</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>765.56</td>
<td>889.48</td>
<td>1102.52</td>
<td>939.38</td>
<td>1413.51</td>
<td>1256.91</td>
</tr>
<tr>
<td>standard dev.</td>
<td>181.37</td>
<td>296.4</td>
<td>14.84</td>
<td>381.24</td>
<td>25.19</td>
<td>19.71</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>592.64</td>
<td>606.89</td>
<td>1088.37</td>
<td>575.91</td>
<td>1389.49</td>
<td>1238.12</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>938.48</td>
<td>1172.07</td>
<td>1116.67</td>
<td>1302.85</td>
<td>1437.52</td>
<td>1275.7</td>
</tr>
<tr>
<td>geom. mean</td>
<td>743.43</td>
<td>829.41</td>
<td>1102.44</td>
<td>867.59</td>
<td>1413.33</td>
<td>1256.79</td>
</tr>
<tr>
<td>median</td>
<td>844.53</td>
<td>1008.62</td>
<td>1106.55</td>
<td>1189.38</td>
<td>1402.57</td>
<td>1248.88</td>
</tr>
<tr>
<td>first quartile</td>
<td>801.9</td>
<td>1000.92</td>
<td>1106.55</td>
<td>541.17</td>
<td>1402.57</td>
<td>1248.88</td>
</tr>
<tr>
<td>third quartile</td>
<td>868.31</td>
<td>1026.39</td>
<td>1106.55</td>
<td>1225.53</td>
<td>1421.58</td>
<td>1260.9</td>
</tr>
<tr>
<td>minimum</td>
<td>444.76</td>
<td>360.38</td>
<td>1077.0</td>
<td>503.73</td>
<td>1387.72</td>
<td>1237.09</td>
</tr>
<tr>
<td>maximum</td>
<td>868.31</td>
<td>1051.09</td>
<td>1115.97</td>
<td>1237.09</td>
<td>1453.1</td>
<td>1288.79</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>13.91 % </td>
<td>2.44 % </td>
<td>16.81 % </td>
<td>-1.19 % </td>
<td>47.45 % </td>
<td>18.19 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.4392</td>
<td>0.8905</td>
<td>0.0406</td>
<td>0.9581</td>
<td>0.0057</td>
<td>0.0046</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
<td>DIFF</td>
<td>SAME</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="256"></a> 
<img src="256.png" alt="256" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="7">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
<td>256</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>256</td><td>873.95</td><td>992.21</td><td>647.35</td><td>698.67</td><td>1250.08</td><td>1460.81</td><td>1201.38</td></tr>
<tr><td>256</td><td>540.0</td><td>431.01</td><td>588.16</td><td>1076.78</td><td>773.97</td><td>972.88</td><td>654.62</td></tr>
<tr><td>256</td><td>838.99</td><td>972.88</td><td>1041.49</td><td>1091.35</td><td>1206.92</td><td>1419.29</td><td>728.78</td></tr>
<tr><td>256</td><td>490.03</td><td>883.53</td><td>596.53</td><td>1101.67</td><td>1131.39</td><td>1225.25</td><td>1156.34</td></tr>
<tr><td>256</td><td>572.11</td><td>943.98</td><td>1003.61</td><td>381.74</td><td>1195.9</td><td>627.96</td><td>677.46</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>663.02</td>
<td>844.72</td>
<td>775.43</td>
<td>870.04</td>
<td>1111.65</td>
<td>1141.24</td>
<td>883.72</td>
</tr>
<tr>
<td>standard dev.</td>
<td>179.43</td>
<td>234.89</td>
<td>227.12</td>
<td>321.39</td>
<td>193.49</td>
<td>345.79</td>
<td>271.23</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>491.95</td>
<td>620.78</td>
<td>558.89</td>
<td>563.63</td>
<td>927.18</td>
<td>811.56</td>
<td>625.13</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>834.09</td>
<td>1068.66</td>
<td>991.96</td>
<td>1176.46</td>
<td>1296.12</td>
<td>1470.91</td>
<td>1142.31</td>
</tr>
<tr>
<td>geom. mean</td>
<td>644.27</td>
<td>809.22</td>
<td>750.06</td>
<td>808.42</td>
<td>1095.79</td>
<td>1091.88</td>
<td>852.02</td>
</tr>
<tr>
<td>median</td>
<td>572.11</td>
<td>943.98</td>
<td>647.35</td>
<td>1076.78</td>
<td>1195.9</td>
<td>1225.25</td>
<td>728.78</td>
</tr>
<tr>
<td>first quartile</td>
<td>540.0</td>
<td>883.53</td>
<td>596.53</td>
<td>698.67</td>
<td>1131.39</td>
<td>972.88</td>
<td>677.46</td>
</tr>
<tr>
<td>third quartile</td>
<td>838.99</td>
<td>972.88</td>
<td>1003.61</td>
<td>1091.35</td>
<td>1206.92</td>
<td>1419.29</td>
<td>1156.34</td>
</tr>
<tr>
<td>minimum</td>
<td>490.03</td>
<td>431.01</td>
<td>588.16</td>
<td>381.74</td>
<td>773.97</td>
<td>627.96</td>
<td>654.62</td>
</tr>
<tr>
<td>maximum</td>
<td>873.95</td>
<td>992.21</td>
<td>1041.49</td>
<td>1101.67</td>
<td>1250.08</td>
<td>1460.81</td>
<td>1201.38</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>256</td><td>905.66</td><td>1086.83</td><td>661.23</td><td>673.98</td><td>1231.0</td><td>1551.59</td><td>1365.68</td></tr>
<tr><td>256</td><td>573.37</td><td>1059.38</td><td>520.69</td><td>1190.47</td><td>1296.45</td><td>1498.38</td><td>694.51</td></tr>
<tr><td>256</td><td>896.37</td><td>1059.38</td><td>1131.39</td><td>1213.9</td><td>1309.4</td><td>1479.36</td><td>708.11</td></tr>
<tr><td>256</td><td>876.88</td><td>1059.38</td><td>1152.53</td><td>1202.76</td><td>1309.4</td><td>1489.87</td><td>1329.32</td></tr>
<tr><td>256</td><td>610.06</td><td>1082.34</td><td>1157.62</td><td>1219.55</td><td>776.83</td><td>809.21</td><td>1358.6</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>772.47</td>
<td>1069.46</td>
<td>924.69</td>
<td>1100.13</td>
<td>1184.62</td>
<td>1365.68</td>
<td>1091.24</td>
</tr>
<tr>
<td>standard dev.</td>
<td>165.84</td>
<td>13.9</td>
<td>308.83</td>
<td>238.49</td>
<td>230.26</td>
<td>312.32</td>
<td>356.25</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>614.36</td>
<td>1056.21</td>
<td>630.25</td>
<td>872.76</td>
<td>965.09</td>
<td>1067.92</td>
<td>751.6</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>930.57</td>
<td>1082.71</td>
<td>1219.13</td>
<td>1327.51</td>
<td>1404.15</td>
<td>1663.45</td>
<td>1430.89</td>
</tr>
<tr>
<td>geom. mean</td>
<td>757.25</td>
<td>1069.39</td>
<td>877.31</td>
<td>1073.95</td>
<td>1162.78</td>
<td>1329.03</td>
<td>1039.37</td>
</tr>
<tr>
<td>median</td>
<td>876.88</td>
<td>1059.38</td>
<td>1131.39</td>
<td>1202.76</td>
<td>1296.45</td>
<td>1489.87</td>
<td>1329.32</td>
</tr>
<tr>
<td>first quartile</td>
<td>610.06</td>
<td>1059.38</td>
<td>661.23</td>
<td>1190.47</td>
<td>1231.0</td>
<td>1479.36</td>
<td>708.11</td>
</tr>
<tr>
<td>third quartile</td>
<td>896.37</td>
<td>1082.34</td>
<td>1152.53</td>
<td>1213.9</td>
<td>1309.4</td>
<td>1498.38</td>
<td>1358.6</td>
</tr>
<tr>
<td>minimum</td>
<td>573.37</td>
<td>1059.38</td>
<td>520.69</td>
<td>673.98</td>
<td>776.83</td>
<td>809.21</td>
<td>694.51</td>
</tr>
<tr>
<td>maximum</td>
<td>905.66</td>
<td>1086.83</td>
<td>1157.62</td>
<td>1219.55</td>
<td>1309.4</td>
<td>1551.59</td>
<td>1365.68</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>16.51 % </td>
<td>26.6 % </td>
<td>19.25 % </td>
<td>26.45 % </td>
<td>6.56 % </td>
<td>19.67 % </td>
<td>23.48 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.3458</td>
<td>0.0652</td>
<td>0.4093</td>
<td>0.2346</td>
<td>0.6023</td>
<td>0.3129</td>
<td>0.3303</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>DIFF</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
</tr>
</table>
<a name="512"></a> 
<img src="512.png" alt="512" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="8">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>512</td><td>894.38</td><td>810.4</td><td>822.47</td><td>805.11</td><td>875.71</td><td>954.2</td><td>1072.82</td><td>1237.4</td></tr>
<tr><td>512</td><td>676.76</td><td>668.35</td><td>742.93</td><td>840.27</td><td>1152.4</td><td>925.97</td><td>1035.22</td><td>1009.8</td></tr>
<tr><td>512</td><td>685.83</td><td>980.52</td><td>801.42</td><td>1080.0</td><td>1154.94</td><td>1244.0</td><td>1437.58</td><td>1196.45</td></tr>
<tr><td>512</td><td>681.38</td><td>623.45</td><td>662.44</td><td>828.0</td><td>744.25</td><td>1231.59</td><td>970.99</td><td>894.38</td></tr>
<tr><td>512</td><td>687.63</td><td>623.45</td><td>891.34</td><td>704.26</td><td>1048.15</td><td>840.27</td><td>889.45</td><td>755.51</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>725.2</td>
<td>741.23</td>
<td>784.12</td>
<td>851.53</td>
<td>995.09</td>
<td>1039.21</td>
<td>1081.21</td>
<td>1018.71</td>
</tr>
<tr>
<td>standard dev.</td>
<td>94.67</td>
<td>154.19</td>
<td>86.27</td>
<td>138.49</td>
<td>180.48</td>
<td>186.13</td>
<td>211.01</td>
<td>202.63</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>634.94</td>
<td>594.22</td>
<td>701.87</td>
<td>719.49</td>
<td>823.03</td>
<td>861.75</td>
<td>880.03</td>
<td>825.53</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>815.46</td>
<td>888.24</td>
<td>866.37</td>
<td>983.57</td>
<td>1167.16</td>
<td>1216.66</td>
<td>1282.39</td>
<td>1211.89</td>
</tr>
<tr>
<td>geom. mean</td>
<td>720.75</td>
<td>729.38</td>
<td>780.23</td>
<td>843.12</td>
<td>981.15</td>
<td>1026.1</td>
<td>1066.36</td>
<td>1002.03</td>
</tr>
<tr>
<td>median</td>
<td>685.83</td>
<td>668.35</td>
<td>801.42</td>
<td>828.0</td>
<td>1048.15</td>
<td>954.2</td>
<td>1035.22</td>
<td>1009.8</td>
</tr>
<tr>
<td>first quartile</td>
<td>681.38</td>
<td>623.45</td>
<td>742.93</td>
<td>805.11</td>
<td>875.71</td>
<td>925.97</td>
<td>970.99</td>
<td>894.38</td>
</tr>
<tr>
<td>third quartile</td>
<td>687.63</td>
<td>810.4</td>
<td>822.47</td>
<td>840.27</td>
<td>1152.4</td>
<td>1231.59</td>
<td>1072.82</td>
<td>1196.45</td>
</tr>
<tr>
<td>minimum</td>
<td>676.76</td>
<td>623.45</td>
<td>662.44</td>
<td>704.26</td>
<td>744.25</td>
<td>840.27</td>
<td>889.45</td>
<td>755.51</td>
</tr>
<tr>
<td>maximum</td>
<td>894.38</td>
<td>980.52</td>
<td>891.34</td>
<td>1080.0</td>
<td>1154.94</td>
<td>1244.0</td>
<td>1437.58</td>
<td>1237.4</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>512</td><td>907.54</td><td>810.4</td><td>851.53</td><td>1128.83</td><td>1244.0</td><td>1291.5</td><td>1445.51</td><td>1298.7</td></tr>
<tr><td>512</td><td>681.16</td><td>791.14</td><td>838.93</td><td>863.8</td><td>1184.96</td><td>759.89</td><td>1039.32</td><td>948.59</td></tr>
<tr><td>512</td><td>564.39</td><td>783.75</td><td>1066.27</td><td>863.8</td><td>905.97</td><td>1259.7</td><td>1099.25</td><td>1354.92</td></tr>
<tr><td>512</td><td>894.38</td><td>995.89</td><td>1059.27</td><td>1113.84</td><td>1167.8</td><td>936.31</td><td>1538.85</td><td>1381.7</td></tr>
<tr><td>512</td><td>844.33</td><td>1005.92</td><td>825.06</td><td>687.86</td><td>1176.98</td><td>954.2</td><td>1427.79</td><td>1369.97</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>778.36</td>
<td>877.42</td>
<td>928.21</td>
<td>931.63</td>
<td>1135.94</td>
<td>1040.32</td>
<td>1310.14</td>
<td>1270.78</td>
</tr>
<tr>
<td>standard dev.</td>
<td>149.78</td>
<td>113.2</td>
<td>123.22</td>
<td>187.56</td>
<td>131.97</td>
<td>228.09</td>
<td>224.88</td>
<td>182.9</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>635.56</td>
<td>769.49</td>
<td>810.74</td>
<td>752.81</td>
<td>1010.12</td>
<td>822.86</td>
<td>1095.74</td>
<td>1096.4</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>921.16</td>
<td>985.34</td>
<td>1045.69</td>
<td>1110.45</td>
<td>1261.76</td>
<td>1257.78</td>
<td>1524.55</td>
<td>1445.15</td>
</tr>
<tr>
<td>geom. mean</td>
<td>765.85</td>
<td>871.73</td>
<td>921.84</td>
<td>916.13</td>
<td>1129.16</td>
<td>1020.08</td>
<td>1294.03</td>
<td>1258.71</td>
</tr>
<tr>
<td>median</td>
<td>844.33</td>
<td>810.4</td>
<td>851.53</td>
<td>863.8</td>
<td>1176.98</td>
<td>954.2</td>
<td>1427.79</td>
<td>1354.92</td>
</tr>
<tr>
<td>first quartile</td>
<td>681.16</td>
<td>791.14</td>
<td>838.93</td>
<td>863.8</td>
<td>1167.8</td>
<td>936.31</td>
<td>1099.25</td>
<td>1298.7</td>
</tr>
<tr>
<td>third quartile</td>
<td>894.38</td>
<td>995.89</td>
<td>1059.27</td>
<td>1113.84</td>
<td>1184.96</td>
<td>1259.7</td>
<td>1445.51</td>
<td>1369.97</td>
</tr>
<tr>
<td>minimum</td>
<td>564.39</td>
<td>783.75</td>
<td>825.06</td>
<td>687.86</td>
<td>905.97</td>
<td>759.89</td>
<td>1039.32</td>
<td>948.59</td>
</tr>
<tr>
<td>maximum</td>
<td>907.54</td>
<td>1005.92</td>
<td>1066.27</td>
<td>1128.83</td>
<td>1244.0</td>
<td>1291.5</td>
<td>1538.85</td>
<td>1381.7</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>7.33 % </td>
<td>18.37 % </td>
<td>18.38 % </td>
<td>9.41 % </td>
<td>14.15 % </td>
<td>0.11 % </td>
<td>21.17 % </td>
<td>24.74 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.5212</td>
<td>0.1501</td>
<td>0.0646</td>
<td>0.4644</td>
<td>0.1966</td>
<td>0.9935</td>
<td>0.1355</td>
<td>0.0728</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
<td>DIFF</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>DIFF</td>
</tr>
</table>
<a name="1024"></a> 
<img src="1024.png" alt="1024" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>1024</td><td>793.65</td><td>874.94</td><td>940.89</td><td>979.56</td><td>1002.99</td><td>1027.81</td><td>1076.34</td><td>1200.5</td><td>1060.56</td></tr>
<tr><td>1024</td><td>575.37</td><td>745.15</td><td>786.21</td><td>654.87</td><td>820.99</td><td>856.89</td><td>936.27</td><td>1049.41</td><td>972.75</td></tr>
<tr><td>1024</td><td>763.46</td><td>858.29</td><td>906.52</td><td>926.75</td><td>961.6</td><td>997.03</td><td>1071.94</td><td>1187.58</td><td>1048.36</td></tr>
<tr><td>1024</td><td>684.92</td><td>753.58</td><td>684.47</td><td>642.63</td><td>812.41</td><td>872.58</td><td>831.9</td><td>1179.23</td><td>960.72</td></tr>
<tr><td>1024</td><td>737.94</td><td>847.37</td><td>900.88</td><td>934.6</td><td>952.21</td><td>887.34</td><td>843.11</td><td>1394.94</td><td>1043.67</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>711.07</td>
<td>815.87</td>
<td>843.79</td>
<td>827.68</td>
<td>910.04</td>
<td>928.33</td>
<td>951.91</td>
<td>1202.33</td>
<td>1017.21</td>
</tr>
<tr>
<td>standard dev.</td>
<td>85.71</td>
<td>61.57</td>
<td>106.44</td>
<td>164.64</td>
<td>87.37</td>
<td>78.28</td>
<td>118.72</td>
<td>123.73</td>
<td>46.69</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>629.35</td>
<td>757.17</td>
<td>742.31</td>
<td>670.72</td>
<td>826.74</td>
<td>853.7</td>
<td>838.73</td>
<td>1084.37</td>
<td>972.7</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>792.78</td>
<td>874.56</td>
<td>945.28</td>
<td>984.65</td>
<td>993.34</td>
<td>1002.96</td>
<td>1065.1</td>
<td>1320.29</td>
<td>1061.72</td>
</tr>
<tr>
<td>geom. mean</td>
<td>706.65</td>
<td>813.98</td>
<td>838.1</td>
<td>813.85</td>
<td>906.62</td>
<td>925.74</td>
<td>946.01</td>
<td>1197.36</td>
<td>1016.34</td>
</tr>
<tr>
<td>median</td>
<td>737.94</td>
<td>847.37</td>
<td>900.88</td>
<td>926.75</td>
<td>952.21</td>
<td>887.34</td>
<td>936.27</td>
<td>1187.58</td>
<td>1043.67</td>
</tr>
<tr>
<td>first quartile</td>
<td>684.92</td>
<td>753.58</td>
<td>786.21</td>
<td>654.87</td>
<td>820.99</td>
<td>872.58</td>
<td>843.11</td>
<td>1179.23</td>
<td>972.75</td>
</tr>
<tr>
<td>third quartile</td>
<td>763.46</td>
<td>858.29</td>
<td>906.52</td>
<td>934.6</td>
<td>961.6</td>
<td>997.03</td>
<td>1071.94</td>
<td>1200.5</td>
<td>1048.36</td>
</tr>
<tr>
<td>minimum</td>
<td>575.37</td>
<td>745.15</td>
<td>684.47</td>
<td>642.63</td>
<td>812.41</td>
<td>856.89</td>
<td>831.9</td>
<td>1049.41</td>
<td>960.72</td>
</tr>
<tr>
<td>maximum</td>
<td>793.65</td>
<td>874.94</td>
<td>940.89</td>
<td>979.56</td>
<td>1002.99</td>
<td>1027.81</td>
<td>1076.34</td>
<td>1394.94</td>
<td>1060.56</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>1024</td><td>713.83</td><td>930.25</td><td>974.78</td><td>1020.56</td><td>1051.52</td><td>1123.63</td><td>1184.9</td><td>1269.15</td><td>1174.94</td></tr>
<tr><td>1024</td><td>700.71</td><td>929.42</td><td>952.43</td><td>1008.05</td><td>1042.89</td><td>1068.39</td><td>1142.92</td><td>1215.1</td><td>1158.71</td></tr>
<tr><td>1024</td><td>780.65</td><td>947.91</td><td>981.4</td><td>1011.21</td><td>1044.97</td><td>1041.6</td><td>1152.34</td><td>1184.9</td><td>1156.15</td></tr>
<tr><td>1024</td><td>773.46</td><td>909.08</td><td>956.99</td><td>1013.16</td><td>1026.55</td><td>1069.48</td><td>1158.71</td><td>1231.52</td><td>1165.47</td></tr>
<tr><td>1024</td><td>774.03</td><td>917.43</td><td>930.25</td><td>1010.97</td><td>1027.81</td><td>963.36</td><td>1150.76</td><td>1250.24</td><td>1165.47</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>748.53</td>
<td>926.82</td>
<td>959.17</td>
<td>1012.79</td>
<td>1038.75</td>
<td>1053.29</td>
<td>1157.93</td>
<td>1230.18</td>
<td>1164.15</td>
</tr>
<tr>
<td>standard dev.</td>
<td>38.06</td>
<td>14.72</td>
<td>20.15</td>
<td>4.71</td>
<td>11.04</td>
<td>58.44</td>
<td>16.09</td>
<td>32.41</td>
<td>7.3</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>712.25</td>
<td>912.79</td>
<td>939.96</td>
<td>1008.3</td>
<td>1028.23</td>
<td>997.58</td>
<td>1142.59</td>
<td>1199.28</td>
<td>1157.18</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>784.82</td>
<td>940.85</td>
<td>978.38</td>
<td>1017.28</td>
<td>1049.27</td>
<td>1109.01</td>
<td>1173.27</td>
<td>1261.08</td>
<td>1171.11</td>
</tr>
<tr>
<td>geom. mean</td>
<td>747.75</td>
<td>926.72</td>
<td>959.0</td>
<td>1012.78</td>
<td>1038.7</td>
<td>1051.97</td>
<td>1157.84</td>
<td>1229.84</td>
<td>1164.13</td>
</tr>
<tr>
<td>median</td>
<td>773.46</td>
<td>929.42</td>
<td>956.99</td>
<td>1011.21</td>
<td>1042.89</td>
<td>1068.39</td>
<td>1152.34</td>
<td>1231.52</td>
<td>1165.47</td>
</tr>
<tr>
<td>first quartile</td>
<td>713.83</td>
<td>917.43</td>
<td>952.43</td>
<td>1010.97</td>
<td>1027.81</td>
<td>1041.6</td>
<td>1150.76</td>
<td>1215.1</td>
<td>1158.71</td>
</tr>
<tr>
<td>third quartile</td>
<td>774.03</td>
<td>930.25</td>
<td>974.78</td>
<td>1013.16</td>
<td>1044.97</td>
<td>1069.48</td>
<td>1158.71</td>
<td>1250.24</td>
<td>1165.47</td>
</tr>
<tr>
<td>minimum</td>
<td>700.71</td>
<td>909.08</td>
<td>930.25</td>
<td>1008.05</td>
<td>1026.55</td>
<td>963.36</td>
<td>1142.92</td>
<td>1184.9</td>
<td>1156.15</td>
</tr>
<tr>
<td>maximum</td>
<td>780.65</td>
<td>947.91</td>
<td>981.4</td>
<td>1020.56</td>
<td>1051.52</td>
<td>1123.63</td>
<td>1184.9</td>
<td>1269.15</td>
<td>1174.94</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>5.27 % </td>
<td>13.6 % </td>
<td>13.67 % </td>
<td>22.36 % </td>
<td>14.14 % </td>
<td>13.46 % </td>
<td>21.64 % </td>
<td>2.32 % </td>
<td>14.45 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.3978</td>
<td>0.0044</td>
<td>0.0444</td>
<td>0.0362</td>
<td>0.0114</td>
<td>0.0211</td>
<td>0.0049</td>
<td>0.6394</td>
<td>0.0001</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>SAME</td>
<td>DIFF</td>
</tr>
</table>
<a name="2048"></a> 
<img src="2048.png" alt="2048" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="10">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>2048</td><td>742.96</td><td>838.21</td><td>867.68</td><td>965.78</td><td>969.47</td><td>986.68</td><td>1027.79</td><td>1148.05</td><td>1205.64</td><td>1133.17</td></tr>
<tr><td>2048</td><td>658.56</td><td>794.54</td><td>791.47</td><td>933.64</td><td>944.68</td><td>803.6</td><td>1005.97</td><td>967.12</td><td>1067.82</td><td>1023.52</td></tr>
<tr><td>2048</td><td>720.5</td><td>853.99</td><td>898.06</td><td>877.95</td><td>878.77</td><td>952.84</td><td>980.8</td><td>1004.53</td><td>1266.62</td><td>1017.32</td></tr>
<tr><td>2048</td><td>664.93</td><td>745.73</td><td>884.61</td><td>798.09</td><td>880.25</td><td>881.45</td><td>925.51</td><td>964.78</td><td>1091.02</td><td>1000.57</td></tr>
<tr><td>2048</td><td>659.85</td><td>844.2</td><td>834.37</td><td>820.74</td><td>873.74</td><td>817.7</td><td>950.57</td><td>868.04</td><td>1197.55</td><td>1016.21</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>689.36</td>
<td>815.33</td>
<td>855.24</td>
<td>879.24</td>
<td>909.38</td>
<td>888.45</td>
<td>978.13</td>
<td>990.51</td>
<td>1165.73</td>
<td>1038.16</td>
</tr>
<tr>
<td>standard dev.</td>
<td>39.56</td>
<td>45.08</td>
<td>42.88</td>
<td>71.52</td>
<td>44.48</td>
<td>80.7</td>
<td>41.16</td>
<td>101.52</td>
<td>83.6</td>
<td>53.78</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>651.65</td>
<td>772.36</td>
<td>814.36</td>
<td>811.06</td>
<td>866.98</td>
<td>811.51</td>
<td>938.88</td>
<td>893.72</td>
<td>1086.03</td>
<td>986.88</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>727.07</td>
<td>858.31</td>
<td>896.12</td>
<td>947.42</td>
<td>951.79</td>
<td>965.39</td>
<td>1017.37</td>
<td>1087.29</td>
<td>1245.43</td>
<td>1089.43</td>
</tr>
<tr>
<td>geom. mean</td>
<td>688.47</td>
<td>814.31</td>
<td>854.36</td>
<td>876.91</td>
<td>908.52</td>
<td>885.53</td>
<td>977.43</td>
<td>986.45</td>
<td>1163.32</td>
<td>1037.09</td>
</tr>
<tr>
<td>median</td>
<td>664.93</td>
<td>838.21</td>
<td>867.68</td>
<td>877.95</td>
<td>880.25</td>
<td>881.45</td>
<td>980.8</td>
<td>967.12</td>
<td>1197.55</td>
<td>1017.32</td>
</tr>
<tr>
<td>first quartile</td>
<td>659.85</td>
<td>794.54</td>
<td>834.37</td>
<td>820.74</td>
<td>878.77</td>
<td>817.7</td>
<td>950.57</td>
<td>964.78</td>
<td>1091.02</td>
<td>1016.21</td>
</tr>
<tr>
<td>third quartile</td>
<td>720.5</td>
<td>844.2</td>
<td>884.61</td>
<td>933.64</td>
<td>944.68</td>
<td>952.84</td>
<td>1005.97</td>
<td>1004.53</td>
<td>1205.64</td>
<td>1023.52</td>
</tr>
<tr>
<td>minimum</td>
<td>658.56</td>
<td>745.73</td>
<td>791.47</td>
<td>798.09</td>
<td>873.74</td>
<td>803.6</td>
<td>925.51</td>
<td>868.04</td>
<td>1067.82</td>
<td>1000.57</td>
</tr>
<tr>
<td>maximum</td>
<td>742.96</td>
<td>853.99</td>
<td>898.06</td>
<td>965.78</td>
<td>969.47</td>
<td>986.68</td>
<td>1027.79</td>
<td>1148.05</td>
<td>1266.62</td>
<td>1133.17</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>2048</td><td>768.91</td><td>961.03</td><td>1021.41</td><td>1073.56</td><td>1085.23</td><td>1090.59</td><td>1148.21</td><td>1169.66</td><td>1392.81</td><td>1184.86</td></tr>
<tr><td>2048</td><td>798.09</td><td>853.3</td><td>999.5</td><td>1021.53</td><td>1054.93</td><td>1068.91</td><td>1104.96</td><td>1250.01</td><td>1368.05</td><td>1169.5</td></tr>
<tr><td>2048</td><td>759.03</td><td>926.32</td><td>977.6</td><td>766.59</td><td>681.68</td><td>1049.91</td><td>1099.6</td><td>1135.62</td><td>1349.56</td><td>1158.68</td></tr>
<tr><td>2048</td><td>738.84</td><td>807.47</td><td>989.59</td><td>1037.83</td><td>1066.6</td><td>1051.49</td><td>1096.43</td><td>1193.97</td><td>1359.62</td><td>1279.57</td></tr>
<tr><td>2048</td><td>739.36</td><td>933.23</td><td>900.95</td><td>1009.0</td><td>1061.07</td><td>1062.68</td><td>1085.79</td><td>1135.01</td><td>1355.01</td><td>1165.6</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>760.84</td>
<td>896.27</td>
<td>977.81</td>
<td>981.7</td>
<td>989.9</td>
<td>1064.72</td>
<td>1107.0</td>
<td>1176.86</td>
<td>1365.01</td>
<td>1191.64</td>
</tr>
<tr>
<td>standard dev.</td>
<td>24.5</td>
<td>63.63</td>
<td>45.87</td>
<td>122.67</td>
<td>172.67</td>
<td>16.47</td>
<td>24.08</td>
<td>47.82</td>
<td>16.95</td>
<td>50.08</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>737.48</td>
<td>835.6</td>
<td>934.08</td>
<td>864.75</td>
<td>825.28</td>
<td>1049.01</td>
<td>1084.04</td>
<td>1131.26</td>
<td>1348.85</td>
<td>1143.9</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>784.21</td>
<td>956.93</td>
<td>1021.54</td>
<td>1098.66</td>
<td>1154.53</td>
<td>1080.42</td>
<td>1129.95</td>
<td>1222.45</td>
<td>1381.17</td>
<td>1239.39</td>
</tr>
<tr>
<td>geom. mean</td>
<td>760.53</td>
<td>894.42</td>
<td>976.92</td>
<td>974.84</td>
<td>975.47</td>
<td>1064.62</td>
<td>1106.79</td>
<td>1176.09</td>
<td>1364.93</td>
<td>1190.83</td>
</tr>
<tr>
<td>median</td>
<td>759.03</td>
<td>926.32</td>
<td>989.59</td>
<td>1021.53</td>
<td>1061.07</td>
<td>1062.68</td>
<td>1099.6</td>
<td>1169.66</td>
<td>1359.62</td>
<td>1169.5</td>
</tr>
<tr>
<td>first quartile</td>
<td>739.36</td>
<td>853.3</td>
<td>977.6</td>
<td>1009.0</td>
<td>1054.93</td>
<td>1051.49</td>
<td>1096.43</td>
<td>1135.62</td>
<td>1355.01</td>
<td>1165.6</td>
</tr>
<tr>
<td>third quartile</td>
<td>768.91</td>
<td>933.23</td>
<td>999.5</td>
<td>1037.83</td>
<td>1066.6</td>
<td>1068.91</td>
<td>1104.96</td>
<td>1193.97</td>
<td>1368.05</td>
<td>1184.86</td>
</tr>
<tr>
<td>minimum</td>
<td>738.84</td>
<td>807.47</td>
<td>900.95</td>
<td>766.59</td>
<td>681.68</td>
<td>1049.91</td>
<td>1085.79</td>
<td>1135.01</td>
<td>1349.56</td>
<td>1158.68</td>
</tr>
<tr>
<td>maximum</td>
<td>798.09</td>
<td>961.03</td>
<td>1021.41</td>
<td>1073.56</td>
<td>1085.23</td>
<td>1090.59</td>
<td>1148.21</td>
<td>1250.01</td>
<td>1392.81</td>
<td>1279.57</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>10.37 % </td>
<td>9.93 % </td>
<td>14.33 % </td>
<td>11.65 % </td>
<td>8.85 % </td>
<td>19.84 % </td>
<td>13.18 % </td>
<td>18.81 % </td>
<td>17.09 % </td>
<td>14.78 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0089</td>
<td>0.0489</td>
<td>0.0024</td>
<td>0.1453</td>
<td>0.3422</td>
<td>0.0014</td>
<td>0.0003</td>
<td>0.0059</td>
<td>0.0008</td>
<td>0.0016</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>SAME</td>
<td>SAME</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="4096"></a> 
<img src="4096.png" alt="4096" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="11">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>4096</td><td>745.43</td><td>880.29</td><td>923.36</td><td>945.84</td><td>976.79</td><td>974.69</td><td>961.29</td><td>981.36</td><td>1030.68</td><td>1235.0</td><td>1011.11</td></tr>
<tr><td>4096</td><td>690.11</td><td>742.92</td><td>805.48</td><td>896.66</td><td>880.06</td><td>885.35</td><td>924.42</td><td>965.72</td><td>977.3</td><td>1204.41</td><td>990.34</td></tr>
<tr><td>4096</td><td>713.9</td><td>849.1</td><td>859.8</td><td>920.37</td><td>918.5</td><td>929.6</td><td>966.16</td><td>937.65</td><td>1005.06</td><td>1183.43</td><td>975.83</td></tr>
<tr><td>4096</td><td>699.55</td><td>789.56</td><td>806.45</td><td>858.0</td><td>867.86</td><td>940.75</td><td>910.92</td><td>953.04</td><td>1007.05</td><td>1123.89</td><td>978.96</td></tr>
<tr><td>4096</td><td>689.77</td><td>754.0</td><td>764.97</td><td>813.33</td><td>896.66</td><td>922.7</td><td>957.4</td><td>897.67</td><td>980.39</td><td>1189.8</td><td>972.77</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>707.75</td>
<td>803.17</td>
<td>832.01</td>
<td>886.84</td>
<td>907.97</td>
<td>930.62</td>
<td>944.04</td>
<td>947.09</td>
<td>1000.1</td>
<td>1187.31</td>
<td>985.8</td>
</tr>
<tr>
<td>standard dev.</td>
<td>23.23</td>
<td>59.77</td>
<td>61.17</td>
<td>52.29</td>
<td>42.91</td>
<td>32.24</td>
<td>24.73</td>
<td>31.97</td>
<td>21.89</td>
<td>40.65</td>
<td>15.63</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>685.6</td>
<td>746.19</td>
<td>773.69</td>
<td>836.99</td>
<td>867.07</td>
<td>899.88</td>
<td>920.46</td>
<td>916.61</td>
<td>979.23</td>
<td>1148.55</td>
<td>970.9</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>729.9</td>
<td>860.16</td>
<td>890.33</td>
<td>936.69</td>
<td>948.88</td>
<td>961.36</td>
<td>967.62</td>
<td>977.57</td>
<td>1020.96</td>
<td>1226.06</td>
<td>1000.71</td>
</tr>
<tr>
<td>geom. mean</td>
<td>707.45</td>
<td>801.41</td>
<td>830.25</td>
<td>885.59</td>
<td>907.18</td>
<td>930.17</td>
<td>943.78</td>
<td>946.65</td>
<td>999.9</td>
<td>1186.74</td>
<td>985.7</td>
</tr>
<tr>
<td>median</td>
<td>699.55</td>
<td>789.56</td>
<td>806.45</td>
<td>896.66</td>
<td>896.66</td>
<td>929.6</td>
<td>957.4</td>
<td>953.04</td>
<td>1005.06</td>
<td>1189.8</td>
<td>978.96</td>
</tr>
<tr>
<td>first quartile</td>
<td>690.11</td>
<td>754.0</td>
<td>805.48</td>
<td>858.0</td>
<td>880.06</td>
<td>922.7</td>
<td>924.42</td>
<td>937.65</td>
<td>980.39</td>
<td>1183.43</td>
<td>975.83</td>
</tr>
<tr>
<td>third quartile</td>
<td>713.9</td>
<td>849.1</td>
<td>859.8</td>
<td>920.37</td>
<td>918.5</td>
<td>940.75</td>
<td>961.29</td>
<td>965.72</td>
<td>1007.05</td>
<td>1204.41</td>
<td>990.34</td>
</tr>
<tr>
<td>minimum</td>
<td>689.77</td>
<td>742.92</td>
<td>764.97</td>
<td>813.33</td>
<td>867.86</td>
<td>885.35</td>
<td>910.92</td>
<td>897.67</td>
<td>977.3</td>
<td>1123.89</td>
<td>972.77</td>
</tr>
<tr>
<td>maximum</td>
<td>745.43</td>
<td>880.29</td>
<td>923.36</td>
<td>945.84</td>
<td>976.79</td>
<td>974.69</td>
<td>966.16</td>
<td>981.36</td>
<td>1030.68</td>
<td>1235.0</td>
<td>1011.11</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>4096</td><td>782.78</td><td>977.08</td><td>1011.11</td><td>1058.78</td><td>1083.11</td><td>1089.3</td><td>1107.13</td><td>1126.76</td><td>1181.34</td><td>1317.53</td><td>1116.34</td></tr>
<tr><td>4096</td><td>760.46</td><td>948.36</td><td>1006.02</td><td>987.2</td><td>1026.96</td><td>1034.62</td><td>1093.21</td><td>1123.29</td><td>1160.1</td><td>1238.37</td><td>1177.86</td></tr>
<tr><td>4096</td><td>788.97</td><td>913.65</td><td>985.75</td><td>966.16</td><td>977.99</td><td>855.42</td><td>1962.75</td><td>1813.2</td><td>1167.21</td><td>1293.26</td><td>1148.75</td></tr>
<tr><td>4096</td><td>730.59</td><td>867.86</td><td>933.27</td><td>1030.43</td><td>1022.76</td><td>1122.69</td><td>1129.64</td><td>1064.96</td><td>1098.65</td><td>1296.16</td><td>1114.78</td></tr>
<tr><td>4096</td><td>710.84</td><td>909.29</td><td>1048.79</td><td>1034.62</td><td>1018.85</td><td>1110.5</td><td>1084.86</td><td>1075.27</td><td>1126.46</td><td>1293.26</td><td>1116.34</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>754.73</td>
<td>923.25</td>
<td>996.99</td>
<td>1015.44</td>
<td>1025.93</td>
<td>1042.51</td>
<td>1275.52</td>
<td>1240.7</td>
<td>1146.75</td>
<td>1287.72</td>
<td>1134.81</td>
</tr>
<tr>
<td>standard dev.</td>
<td>33.54</td>
<td>41.48</td>
<td>42.28</td>
<td>37.74</td>
<td>37.51</td>
<td>109.89</td>
<td>384.55</td>
<td>321.24</td>
<td>33.61</td>
<td>29.4</td>
<td>27.98</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>722.75</td>
<td>883.7</td>
<td>956.68</td>
<td>979.46</td>
<td>990.17</td>
<td>937.74</td>
<td>908.89</td>
<td>934.43</td>
<td>1114.7</td>
<td>1259.69</td>
<td>1108.14</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>786.71</td>
<td>962.8</td>
<td>1037.3</td>
<td>1051.42</td>
<td>1061.7</td>
<td>1147.28</td>
<td>1642.14</td>
<td>1546.96</td>
<td>1178.8</td>
<td>1315.74</td>
<td>1161.49</td>
</tr>
<tr>
<td>geom. mean</td>
<td>754.13</td>
<td>922.5</td>
<td>996.26</td>
<td>1014.87</td>
<td>1025.39</td>
<td>1037.47</td>
<td>1238.27</td>
<td>1213.18</td>
<td>1146.35</td>
<td>1287.44</td>
<td>1134.54</td>
</tr>
<tr>
<td>median</td>
<td>760.46</td>
<td>913.65</td>
<td>1006.02</td>
<td>1030.43</td>
<td>1022.76</td>
<td>1089.3</td>
<td>1107.13</td>
<td>1123.29</td>
<td>1160.1</td>
<td>1293.26</td>
<td>1116.34</td>
</tr>
<tr>
<td>first quartile</td>
<td>730.59</td>
<td>909.29</td>
<td>985.75</td>
<td>987.2</td>
<td>1018.85</td>
<td>1034.62</td>
<td>1093.21</td>
<td>1075.27</td>
<td>1126.46</td>
<td>1293.26</td>
<td>1116.34</td>
</tr>
<tr>
<td>third quartile</td>
<td>782.78</td>
<td>948.36</td>
<td>1011.11</td>
<td>1034.62</td>
<td>1026.96</td>
<td>1110.5</td>
<td>1129.64</td>
<td>1126.76</td>
<td>1167.21</td>
<td>1296.16</td>
<td>1148.75</td>
</tr>
<tr>
<td>minimum</td>
<td>710.84</td>
<td>867.86</td>
<td>933.27</td>
<td>966.16</td>
<td>977.99</td>
<td>855.42</td>
<td>1084.86</td>
<td>1064.96</td>
<td>1098.65</td>
<td>1238.37</td>
<td>1114.78</td>
</tr>
<tr>
<td>maximum</td>
<td>788.97</td>
<td>977.08</td>
<td>1048.79</td>
<td>1058.78</td>
<td>1083.11</td>
<td>1122.69</td>
<td>1962.75</td>
<td>1813.2</td>
<td>1181.34</td>
<td>1317.53</td>
<td>1177.86</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>6.64 % </td>
<td>14.95 % </td>
<td>19.83 % </td>
<td>14.5 % </td>
<td>12.99 % </td>
<td>12.02 % </td>
<td>35.11 % </td>
<td>31.0 % </td>
<td>14.66 % </td>
<td>8.46 % </td>
<td>15.12 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0329</td>
<td>0.0061</td>
<td>0.0011</td>
<td>0.0021</td>
<td>0.0017</td>
<td>0.0604</td>
<td>0.0906</td>
<td>0.0764</td>
<td>0.0</td>
<td>0.0021</td>
<td>0.0</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="8192"></a> 
<img src="8192.png" alt="8192" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="12">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>8192</td><td>751.94</td><td>868.14</td><td>914.07</td><td>953.42</td><td>953.85</td><td>956.13</td><td>973.47</td><td>953.42</td><td>958.89</td><td>1015.36</td><td>1159.42</td><td>946.96</td></tr>
<tr><td>8192</td><td>705.59</td><td>791.38</td><td>863.07</td><td>892.96</td><td>925.8</td><td>949.1</td><td>915.94</td><td>901.5</td><td>929.8</td><td>1001.99</td><td>1128.19</td><td>948.0</td></tr>
<tr><td>8192</td><td>711.04</td><td>803.86</td><td>860.04</td><td>893.36</td><td>912.31</td><td>934.9</td><td>922.49</td><td>893.55</td><td>923.58</td><td>995.27</td><td>1140.73</td><td>916.82</td></tr>
<tr><td>8192</td><td>690.25</td><td>798.16</td><td>874.89</td><td>885.74</td><td>912.18</td><td>895.65</td><td>935.45</td><td>905.17</td><td>910.75</td><td>1000.26</td><td>1122.34</td><td>917.32</td></tr>
<tr><td>8192</td><td>682.64</td><td>815.66</td><td>821.85</td><td>854.89</td><td>889.26</td><td>917.95</td><td>917.97</td><td>895.08</td><td>920.59</td><td>979.93</td><td>1137.64</td><td>924.65</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>708.29</td>
<td>815.44</td>
<td>866.79</td>
<td>896.07</td>
<td>918.68</td>
<td>930.75</td>
<td>933.06</td>
<td>909.74</td>
<td>928.72</td>
<td>998.56</td>
<td>1137.66</td>
<td>930.75</td>
</tr>
<tr>
<td>standard dev.</td>
<td>26.94</td>
<td>30.78</td>
<td>33.09</td>
<td>35.74</td>
<td>23.64</td>
<td>24.47</td>
<td>23.83</td>
<td>24.87</td>
<td>18.22</td>
<td>12.8</td>
<td>14.2</td>
<td>15.59</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>682.61</td>
<td>786.1</td>
<td>835.24</td>
<td>862.0</td>
<td>896.14</td>
<td>907.42</td>
<td>910.35</td>
<td>886.03</td>
<td>911.35</td>
<td>986.36</td>
<td>1124.12</td>
<td>915.89</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>733.98</td>
<td>844.78</td>
<td>898.33</td>
<td>930.14</td>
<td>941.22</td>
<td>954.07</td>
<td>955.78</td>
<td>933.45</td>
<td>946.09</td>
<td>1010.76</td>
<td>1151.21</td>
<td>945.61</td>
</tr>
<tr>
<td>geom. mean</td>
<td>707.89</td>
<td>814.99</td>
<td>866.28</td>
<td>895.51</td>
<td>918.44</td>
<td>930.49</td>
<td>932.83</td>
<td>909.48</td>
<td>928.58</td>
<td>998.5</td>
<td>1137.59</td>
<td>930.65</td>
</tr>
<tr>
<td>median</td>
<td>705.59</td>
<td>803.86</td>
<td>863.07</td>
<td>892.96</td>
<td>912.31</td>
<td>934.9</td>
<td>922.49</td>
<td>901.5</td>
<td>923.58</td>
<td>1000.26</td>
<td>1137.64</td>
<td>924.65</td>
</tr>
<tr>
<td>first quartile</td>
<td>690.25</td>
<td>798.16</td>
<td>860.04</td>
<td>885.74</td>
<td>912.18</td>
<td>917.95</td>
<td>917.97</td>
<td>895.08</td>
<td>920.59</td>
<td>995.27</td>
<td>1128.19</td>
<td>917.32</td>
</tr>
<tr>
<td>third quartile</td>
<td>711.04</td>
<td>815.66</td>
<td>874.89</td>
<td>893.36</td>
<td>925.8</td>
<td>949.1</td>
<td>935.45</td>
<td>905.17</td>
<td>929.8</td>
<td>1001.99</td>
<td>1140.73</td>
<td>946.96</td>
</tr>
<tr>
<td>minimum</td>
<td>682.64</td>
<td>791.38</td>
<td>821.85</td>
<td>854.89</td>
<td>889.26</td>
<td>895.65</td>
<td>915.94</td>
<td>893.55</td>
<td>910.75</td>
<td>979.93</td>
<td>1122.34</td>
<td>916.82</td>
</tr>
<tr>
<td>maximum</td>
<td>751.94</td>
<td>868.14</td>
<td>914.07</td>
<td>953.42</td>
<td>953.85</td>
<td>956.13</td>
<td>973.47</td>
<td>953.42</td>
<td>958.89</td>
<td>1015.36</td>
<td>1159.42</td>
<td>948.0</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>8192</td><td>788.94</td><td>943.53</td><td>1014.96</td><td>1052.36</td><td>1068.38</td><td>1078.48</td><td>1089.75</td><td>1056.24</td><td>1066.95</td><td>1108.8</td><td>1237.63</td><td>1033.72</td></tr>
<tr><td>8192</td><td>774.07</td><td>917.32</td><td>1000.61</td><td>1035.86</td><td>1069.95</td><td>1070.36</td><td>1070.22</td><td>1046.29</td><td>1056.67</td><td>1075.85</td><td>1265.02</td><td>1074.26</td></tr>
<tr><td>8192</td><td>770.2</td><td>925.41</td><td>1006.56</td><td>1045.35</td><td>1057.94</td><td>1062.83</td><td>1104.97</td><td>1047.53</td><td>1076.54</td><td>1125.5</td><td>1243.41</td><td>1082.37</td></tr>
<tr><td>8192</td><td>747.03</td><td>922.31</td><td>992.68</td><td>1064.69</td><td>1051.51</td><td>1089.33</td><td>1102.68</td><td>1031.34</td><td>1044.79</td><td>1116.66</td><td>1220.83</td><td>1041.23</td></tr>
<tr><td>8192</td><td>760.37</td><td>914.72</td><td>997.88</td><td>1035.35</td><td>1073.51</td><td>1062.83</td><td>1094.84</td><td>1034.39</td><td>1055.97</td><td>1110.2</td><td>1246.88</td><td>1038.55</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>768.13</td>
<td>924.66</td>
<td>1002.54</td>
<td>1046.72</td>
<td>1064.26</td>
<td>1072.76</td>
<td>1092.49</td>
<td>1043.16</td>
<td>1060.19</td>
<td>1107.4</td>
<td>1242.75</td>
<td>1054.03</td>
</tr>
<tr>
<td>standard dev.</td>
<td>15.64</td>
<td>11.34</td>
<td>8.56</td>
<td>12.29</td>
<td>9.18</td>
<td>11.29</td>
<td>13.86</td>
<td>10.21</td>
<td>12.04</td>
<td>18.83</td>
<td>15.97</td>
<td>22.52</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>753.22</td>
<td>913.84</td>
<td>994.38</td>
<td>1035.01</td>
<td>1055.5</td>
<td>1062.0</td>
<td>1079.28</td>
<td>1033.43</td>
<td>1048.7</td>
<td>1089.45</td>
<td>1227.53</td>
<td>1032.56</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>783.03</td>
<td>935.47</td>
<td>1010.7</td>
<td>1058.43</td>
<td>1073.01</td>
<td>1083.53</td>
<td>1105.71</td>
<td>1052.89</td>
<td>1071.67</td>
<td>1125.36</td>
<td>1257.98</td>
<td>1075.5</td>
</tr>
<tr>
<td>geom. mean</td>
<td>768.0</td>
<td>924.6</td>
<td>1002.51</td>
<td>1046.66</td>
<td>1064.22</td>
<td>1072.72</td>
<td>1092.42</td>
<td>1043.12</td>
<td>1060.13</td>
<td>1107.27</td>
<td>1242.67</td>
<td>1053.84</td>
</tr>
<tr>
<td>median</td>
<td>770.2</td>
<td>922.31</td>
<td>1000.61</td>
<td>1045.35</td>
<td>1068.38</td>
<td>1070.36</td>
<td>1094.84</td>
<td>1046.29</td>
<td>1056.67</td>
<td>1110.2</td>
<td>1243.41</td>
<td>1041.23</td>
</tr>
<tr>
<td>first quartile</td>
<td>760.37</td>
<td>917.32</td>
<td>997.88</td>
<td>1035.86</td>
<td>1057.94</td>
<td>1062.83</td>
<td>1089.75</td>
<td>1034.39</td>
<td>1055.97</td>
<td>1108.8</td>
<td>1237.63</td>
<td>1038.55</td>
</tr>
<tr>
<td>third quartile</td>
<td>774.07</td>
<td>925.41</td>
<td>1006.56</td>
<td>1052.36</td>
<td>1069.95</td>
<td>1078.48</td>
<td>1102.68</td>
<td>1047.53</td>
<td>1066.95</td>
<td>1116.66</td>
<td>1246.88</td>
<td>1074.26</td>
</tr>
<tr>
<td>minimum</td>
<td>747.03</td>
<td>914.72</td>
<td>992.68</td>
<td>1035.35</td>
<td>1051.51</td>
<td>1062.83</td>
<td>1070.22</td>
<td>1031.34</td>
<td>1044.79</td>
<td>1075.85</td>
<td>1220.83</td>
<td>1033.72</td>
</tr>
<tr>
<td>maximum</td>
<td>788.94</td>
<td>943.53</td>
<td>1014.96</td>
<td>1064.69</td>
<td>1073.51</td>
<td>1089.33</td>
<td>1104.97</td>
<td>1056.24</td>
<td>1076.54</td>
<td>1125.5</td>
<td>1265.02</td>
<td>1082.37</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>8.45 % </td>
<td>13.39 % </td>
<td>15.66 % </td>
<td>16.81 % </td>
<td>15.85 % </td>
<td>15.26 % </td>
<td>17.09 % </td>
<td>14.67 % </td>
<td>14.16 % </td>
<td>10.9 % </td>
<td>9.24 % </td>
<td>13.25 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0026</td>
<td>0.0001</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="16384"></a> 
<img src="16384.png" alt="16384" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="13">Block size [kB]</td>
</tr>
<tr><td>4</td>
<td>8</td>
<td>16</td>
<td>32</td>
<td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>16384</td><td>748.96</td><td>840.78</td><td>908.93</td><td>920.97</td><td>943.95</td><td>937.49</td><td>955.91</td><td>932.45</td><td>917.58</td><td>926.52</td><td>972.76</td><td>1127.71</td><td>947.09</td></tr>
<tr><td>16384</td><td>706.37</td><td>824.15</td><td>876.23</td><td>910.5</td><td>935.4</td><td>923.15</td><td>935.89</td><td>897.86</td><td>897.97</td><td>905.34</td><td>969.52</td><td>1094.62</td><td>919.48</td></tr>
<tr><td>16384</td><td>719.58</td><td>812.63</td><td>878.45</td><td>919.11</td><td>929.91</td><td>898.87</td><td>933.21</td><td>908.73</td><td>888.14</td><td>895.36</td><td>950.96</td><td>1105.44</td><td>928.93</td></tr>
<tr><td>16384</td><td>695.02</td><td>802.48</td><td>867.21</td><td>887.56</td><td>880.72</td><td>915.9</td><td>930.62</td><td>889.04</td><td>891.66</td><td>912.87</td><td>965.31</td><td>1106.66</td><td>917.74</td></tr>
<tr><td>16384</td><td>699.79</td><td>804.35</td><td>862.91</td><td>883.73</td><td>877.67</td><td>914.29</td><td>927.8</td><td>892.21</td><td>888.1</td><td>903.39</td><td>968.16</td><td>1078.09</td><td>914.65</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>713.94</td>
<td>816.88</td>
<td>878.74</td>
<td>904.37</td>
<td>913.53</td>
<td>917.94</td>
<td>936.69</td>
<td>904.06</td>
<td>896.69</td>
<td>908.7</td>
<td>965.34</td>
<td>1102.51</td>
<td>925.58</td>
</tr>
<tr>
<td>standard dev.</td>
<td>21.64</td>
<td>15.86</td>
<td>18.04</td>
<td>17.6</td>
<td>31.76</td>
<td>14.05</td>
<td>11.16</td>
<td>17.55</td>
<td>12.35</td>
<td>11.75</td>
<td>8.48</td>
<td>18.16</td>
<td>13.15</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>693.31</td>
<td>801.75</td>
<td>861.55</td>
<td>887.59</td>
<td>883.25</td>
<td>904.54</td>
<td>926.05</td>
<td>887.32</td>
<td>884.91</td>
<td>897.49</td>
<td>957.26</td>
<td>1085.19</td>
<td>913.04</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>734.58</td>
<td>832.0</td>
<td>895.94</td>
<td>921.15</td>
<td>943.81</td>
<td>931.34</td>
<td>947.33</td>
<td>920.79</td>
<td>908.47</td>
<td>919.9</td>
<td>973.42</td>
<td>1119.82</td>
<td>938.12</td>
</tr>
<tr>
<td>geom. mean</td>
<td>713.69</td>
<td>816.76</td>
<td>878.6</td>
<td>904.24</td>
<td>913.08</td>
<td>917.85</td>
<td>936.64</td>
<td>903.92</td>
<td>896.62</td>
<td>908.64</td>
<td>965.31</td>
<td>1102.39</td>
<td>925.51</td>
</tr>
<tr>
<td>median</td>
<td>706.37</td>
<td>812.63</td>
<td>876.23</td>
<td>910.5</td>
<td>929.91</td>
<td>915.9</td>
<td>933.21</td>
<td>897.86</td>
<td>891.66</td>
<td>905.34</td>
<td>968.16</td>
<td>1105.44</td>
<td>919.48</td>
</tr>
<tr>
<td>first quartile</td>
<td>699.79</td>
<td>804.35</td>
<td>867.21</td>
<td>887.56</td>
<td>880.72</td>
<td>914.29</td>
<td>930.62</td>
<td>892.21</td>
<td>888.14</td>
<td>903.39</td>
<td>965.31</td>
<td>1094.62</td>
<td>917.74</td>
</tr>
<tr>
<td>third quartile</td>
<td>719.58</td>
<td>824.15</td>
<td>878.45</td>
<td>919.11</td>
<td>935.4</td>
<td>923.15</td>
<td>935.89</td>
<td>908.73</td>
<td>897.97</td>
<td>912.87</td>
<td>969.52</td>
<td>1106.66</td>
<td>928.93</td>
</tr>
<tr>
<td>minimum</td>
<td>695.02</td>
<td>802.48</td>
<td>862.91</td>
<td>883.73</td>
<td>877.67</td>
<td>898.87</td>
<td>927.8</td>
<td>889.04</td>
<td>888.1</td>
<td>895.36</td>
<td>950.96</td>
<td>1078.09</td>
<td>914.65</td>
</tr>
<tr>
<td>maximum</td>
<td>748.96</td>
<td>840.78</td>
<td>908.93</td>
<td>920.97</td>
<td>943.95</td>
<td>937.49</td>
<td>955.91</td>
<td>932.45</td>
<td>917.58</td>
<td>926.52</td>
<td>972.76</td>
<td>1127.71</td>
<td>947.09</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>16384</td><td>782.93</td><td>932.83</td><td>1012.14</td><td>1061.3</td><td>1073.62</td><td>1096.95</td><td>1087.77</td><td>1034.13</td><td>1043.36</td><td>1035.12</td><td>1091.7</td><td>1198.14</td><td>1029.86</td></tr>
<tr><td>16384</td><td>765.52</td><td>932.51</td><td>998.62</td><td>1033.19</td><td>1080.5</td><td>1074.85</td><td>1078.75</td><td>1052.01</td><td>1002.44</td><td>1012.34</td><td>1081.31</td><td>1194.75</td><td>1070.75</td></tr>
<tr><td>16384</td><td>786.55</td><td>938.63</td><td>1015.94</td><td>1050.83</td><td>1066.95</td><td>1088.35</td><td>1098.15</td><td>1046.03</td><td>1037.81</td><td>1039.64</td><td>819.0</td><td>1195.2</td><td>1094.46</td></tr>
<tr><td>16384</td><td>766.39</td><td>925.08</td><td>1014.13</td><td>1022.96</td><td>1090.88</td><td>1075.48</td><td>1086.07</td><td>1051.52</td><td>1021.18</td><td>1036.8</td><td>1072.96</td><td>1165.07</td><td>1069.09</td></tr>
<tr><td>16384</td><td>765.15</td><td>936.5</td><td>1003.08</td><td>1038.55</td><td>1064.26</td><td>1077.07</td><td>1091.7</td><td>1052.69</td><td>1011.38</td><td>1034.53</td><td>1088.58</td><td>1197.52</td><td>1062.36</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>773.31</td>
<td>933.11</td>
<td>1008.78</td>
<td>1041.37</td>
<td>1075.24</td>
<td>1082.54</td>
<td>1088.49</td>
<td>1047.28</td>
<td>1023.23</td>
<td>1031.69</td>
<td>1030.71</td>
<td>1190.13</td>
<td>1065.3</td>
</tr>
<tr>
<td>standard dev.</td>
<td>10.52</td>
<td>5.17</td>
<td>7.53</td>
<td>15.0</td>
<td>10.77</td>
<td>9.75</td>
<td>7.16</td>
<td>7.81</td>
<td>17.28</td>
<td>11.0</td>
<td>118.57</td>
<td>14.09</td>
<td>23.23</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>763.27</td>
<td>928.18</td>
<td>1001.6</td>
<td>1027.06</td>
<td>1064.97</td>
<td>1073.24</td>
<td>1081.66</td>
<td>1039.83</td>
<td>1006.76</td>
<td>1021.2</td>
<td>917.67</td>
<td>1176.7</td>
<td>1043.16</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>783.34</td>
<td>938.04</td>
<td>1015.96</td>
<td>1055.67</td>
<td>1085.52</td>
<td>1091.84</td>
<td>1095.31</td>
<td>1054.72</td>
<td>1039.71</td>
<td>1042.17</td>
<td>1143.75</td>
<td>1203.57</td>
<td>1087.45</td>
</tr>
<tr>
<td>geom. mean</td>
<td>773.25</td>
<td>933.1</td>
<td>1008.76</td>
<td>1041.28</td>
<td>1075.2</td>
<td>1082.51</td>
<td>1088.47</td>
<td>1047.25</td>
<td>1023.12</td>
<td>1031.64</td>
<td>1024.6</td>
<td>1190.07</td>
<td>1065.1</td>
</tr>
<tr>
<td>median</td>
<td>766.39</td>
<td>932.83</td>
<td>1012.14</td>
<td>1038.55</td>
<td>1073.62</td>
<td>1077.07</td>
<td>1087.77</td>
<td>1051.52</td>
<td>1021.18</td>
<td>1035.12</td>
<td>1081.31</td>
<td>1195.2</td>
<td>1069.09</td>
</tr>
<tr>
<td>first quartile</td>
<td>765.52</td>
<td>932.51</td>
<td>1003.08</td>
<td>1033.19</td>
<td>1066.95</td>
<td>1075.48</td>
<td>1086.07</td>
<td>1046.03</td>
<td>1011.38</td>
<td>1034.53</td>
<td>1072.96</td>
<td>1194.75</td>
<td>1062.36</td>
</tr>
<tr>
<td>third quartile</td>
<td>782.93</td>
<td>936.5</td>
<td>1014.13</td>
<td>1050.83</td>
<td>1080.5</td>
<td>1088.35</td>
<td>1091.7</td>
<td>1052.01</td>
<td>1037.81</td>
<td>1036.8</td>
<td>1088.58</td>
<td>1197.52</td>
<td>1070.75</td>
</tr>
<tr>
<td>minimum</td>
<td>765.15</td>
<td>925.08</td>
<td>998.62</td>
<td>1022.96</td>
<td>1064.26</td>
<td>1074.85</td>
<td>1078.75</td>
<td>1034.13</td>
<td>1002.44</td>
<td>1012.34</td>
<td>819.0</td>
<td>1165.07</td>
<td>1029.86</td>
</tr>
<tr>
<td>maximum</td>
<td>786.55</td>
<td>938.63</td>
<td>1015.94</td>
<td>1061.3</td>
<td>1090.88</td>
<td>1096.95</td>
<td>1098.15</td>
<td>1052.69</td>
<td>1043.36</td>
<td>1039.64</td>
<td>1091.7</td>
<td>1198.14</td>
<td>1094.46</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>8.31 % </td>
<td>14.23 % </td>
<td>14.8 % </td>
<td>15.15 % </td>
<td>17.7 % </td>
<td>17.93 % </td>
<td>16.21 % </td>
<td>15.84 % </td>
<td>14.11 % </td>
<td>13.53 % </td>
<td>6.77 % </td>
<td>7.95 % </td>
<td>15.1 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0006</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.2538</td>
<td>0.0</td>
<td>0.0</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>SAME</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="32768"></a> 
<img src="32768.png" alt="32768" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>32768</td><td>950.4</td><td>952.16</td><td>944.84</td><td>916.88</td><td>900.75</td><td>894.78</td><td>915.18</td><td>961.36</td><td>1105.97</td></tr>
<tr><td>32768</td><td>924.88</td><td>931.75</td><td>927.67</td><td>899.79</td><td>871.44</td><td>880.09</td><td>888.47</td><td>944.93</td><td>1117.59</td></tr>
<tr><td>32768</td><td>905.71</td><td>923.12</td><td>919.38</td><td>887.63</td><td>868.74</td><td>880.52</td><td>885.39</td><td>949.61</td><td>1081.33</td></tr>
<tr><td>32768</td><td>903.26</td><td>926.21</td><td>930.96</td><td>887.68</td><td>879.02</td><td>871.58</td><td>874.34</td><td>931.58</td><td>1099.02</td></tr>
<tr><td>32768</td><td>904.93</td><td>915.7</td><td>906.8</td><td>888.97</td><td>873.01</td><td>869.58</td><td>883.41</td><td>957.8</td><td>1099.8</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>917.84</td>
<td>929.79</td>
<td>925.93</td>
<td>896.19</td>
<td>878.59</td>
<td>879.31</td>
<td>889.36</td>
<td>949.06</td>
<td>1100.74</td>
</tr>
<tr>
<td>standard dev.</td>
<td>20.22</td>
<td>13.78</td>
<td>14.1</td>
<td>12.64</td>
<td>12.95</td>
<td>9.95</td>
<td>15.36</td>
<td>11.73</td>
<td>13.15</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>898.56</td>
<td>916.65</td>
<td>912.49</td>
<td>884.14</td>
<td>866.25</td>
<td>869.83</td>
<td>874.71</td>
<td>937.87</td>
<td>1088.2</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>937.12</td>
<td>942.93</td>
<td>939.37</td>
<td>908.24</td>
<td>890.93</td>
<td>888.79</td>
<td>904.0</td>
<td>960.24</td>
<td>1113.28</td>
</tr>
<tr>
<td>geom. mean</td>
<td>917.66</td>
<td>929.71</td>
<td>925.85</td>
<td>896.12</td>
<td>878.52</td>
<td>879.27</td>
<td>889.25</td>
<td>949.0</td>
<td>1100.68</td>
</tr>
<tr>
<td>median</td>
<td>905.71</td>
<td>926.21</td>
<td>927.67</td>
<td>888.97</td>
<td>873.01</td>
<td>880.09</td>
<td>885.39</td>
<td>949.61</td>
<td>1099.8</td>
</tr>
<tr>
<td>first quartile</td>
<td>904.93</td>
<td>923.12</td>
<td>919.38</td>
<td>887.68</td>
<td>871.44</td>
<td>871.58</td>
<td>883.41</td>
<td>944.93</td>
<td>1099.02</td>
</tr>
<tr>
<td>third quartile</td>
<td>924.88</td>
<td>931.75</td>
<td>930.96</td>
<td>899.79</td>
<td>879.02</td>
<td>880.52</td>
<td>888.47</td>
<td>957.8</td>
<td>1105.97</td>
</tr>
<tr>
<td>minimum</td>
<td>903.26</td>
<td>915.7</td>
<td>906.8</td>
<td>887.63</td>
<td>868.74</td>
<td>869.58</td>
<td>874.34</td>
<td>931.58</td>
<td>1081.33</td>
</tr>
<tr>
<td>maximum</td>
<td>950.4</td>
<td>952.16</td>
<td>944.84</td>
<td>916.88</td>
<td>900.75</td>
<td>894.78</td>
<td>915.18</td>
<td>961.36</td>
<td>1117.59</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>32768</td><td>1075.77</td><td>1094.43</td><td>1091.85</td><td>1042.68</td><td>1013.88</td><td>1011.03</td><td>1002.41</td><td>1045.13</td><td>1185.71</td></tr>
<tr><td>32768</td><td>1071.56</td><td>1020.24</td><td>984.49</td><td>1019.6</td><td>998.69</td><td>989.36</td><td>997.57</td><td>1043.64</td><td>1179.51</td></tr>
<tr><td>32768</td><td>1080.87</td><td>1105.55</td><td>1093.79</td><td>1049.04</td><td>1026.1</td><td>1015.46</td><td>1012.28</td><td>1058.69</td><td>1207.64</td></tr>
<tr><td>32768</td><td>1065.18</td><td>1088.77</td><td>1073.43</td><td>1032.69</td><td>1011.48</td><td>995.58</td><td>993.88</td><td>1060.52</td><td>1186.37</td></tr>
<tr><td>32768</td><td>1074.98</td><td>1080.72</td><td>1094.66</td><td>1049.21</td><td>1009.88</td><td>1002.7</td><td>1001.22</td><td>1063.26</td><td>1188.14</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1073.67</td>
<td>1077.94</td>
<td>1067.64</td>
<td>1038.64</td>
<td>1012.0</td>
<td>1002.83</td>
<td>1001.47</td>
<td>1054.25</td>
<td>1189.47</td>
</tr>
<tr>
<td>standard dev.</td>
<td>5.8</td>
<td>33.5</td>
<td>47.29</td>
<td>12.59</td>
<td>9.8</td>
<td>10.73</td>
<td>6.9</td>
<td>9.17</td>
<td>10.66</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1068.14</td>
<td>1046.01</td>
<td>1022.55</td>
<td>1026.64</td>
<td>1002.66</td>
<td>992.6</td>
<td>994.89</td>
<td>1045.51</td>
<td>1179.31</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1079.2</td>
<td>1109.88</td>
<td>1112.73</td>
<td>1050.65</td>
<td>1021.35</td>
<td>1013.05</td>
<td>1008.05</td>
<td>1062.99</td>
<td>1199.64</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1073.66</td>
<td>1077.52</td>
<td>1066.77</td>
<td>1038.58</td>
<td>1011.97</td>
<td>1002.78</td>
<td>1001.45</td>
<td>1054.22</td>
<td>1189.44</td>
</tr>
<tr>
<td>median</td>
<td>1074.98</td>
<td>1088.77</td>
<td>1091.85</td>
<td>1042.68</td>
<td>1011.48</td>
<td>1002.7</td>
<td>1001.22</td>
<td>1058.69</td>
<td>1186.37</td>
</tr>
<tr>
<td>first quartile</td>
<td>1071.56</td>
<td>1080.72</td>
<td>1073.43</td>
<td>1032.69</td>
<td>1009.88</td>
<td>995.58</td>
<td>997.57</td>
<td>1045.13</td>
<td>1185.71</td>
</tr>
<tr>
<td>third quartile</td>
<td>1075.77</td>
<td>1094.43</td>
<td>1093.79</td>
<td>1049.04</td>
<td>1013.88</td>
<td>1011.03</td>
<td>1002.41</td>
<td>1060.52</td>
<td>1188.14</td>
</tr>
<tr>
<td>minimum</td>
<td>1065.18</td>
<td>1020.24</td>
<td>984.49</td>
<td>1019.6</td>
<td>998.69</td>
<td>989.36</td>
<td>993.88</td>
<td>1043.64</td>
<td>1179.51</td>
</tr>
<tr>
<td>maximum</td>
<td>1080.87</td>
<td>1105.55</td>
<td>1094.66</td>
<td>1049.21</td>
<td>1026.1</td>
<td>1015.46</td>
<td>1012.28</td>
<td>1063.26</td>
<td>1207.64</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>16.98 % </td>
<td>15.93 % </td>
<td>15.3 % </td>
<td>15.9 % </td>
<td>15.18 % </td>
<td>14.05 % </td>
<td>12.61 % </td>
<td>11.08 % </td>
<td>8.06 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0002</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="65536"></a> 
<img src="65536.png" alt="65536" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>65536</td><td>947.98</td><td>946.79</td><td>948.82</td><td>914.08</td><td>892.97</td><td>879.58</td><td>862.24</td><td>889.98</td><td>971.96</td></tr>
<tr><td>65536</td><td>915.92</td><td>923.52</td><td>937.89</td><td>897.31</td><td>868.0</td><td>853.77</td><td>853.49</td><td>875.44</td><td>955.98</td></tr>
<tr><td>65536</td><td>922.63</td><td>862.96</td><td>932.78</td><td>879.39</td><td>875.43</td><td>863.5</td><td>848.28</td><td>862.47</td><td>944.26</td></tr>
<tr><td>65536</td><td>908.72</td><td>924.98</td><td>926.6</td><td>887.21</td><td>861.39</td><td>850.07</td><td>842.24</td><td>874.98</td><td>951.41</td></tr>
<tr><td>65536</td><td>913.03</td><td>908.07</td><td>921.76</td><td>874.84</td><td>858.69</td><td>856.5</td><td>849.79</td><td>877.18</td><td>950.81</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>921.66</td>
<td>913.26</td>
<td>933.57</td>
<td>890.57</td>
<td>871.3</td>
<td>860.68</td>
<td>851.21</td>
<td>876.01</td>
<td>954.88</td>
</tr>
<tr>
<td>standard dev.</td>
<td>15.56</td>
<td>31.32</td>
<td>10.49</td>
<td>15.67</td>
<td>13.74</td>
<td>11.65</td>
<td>7.38</td>
<td>9.76</td>
<td>10.42</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>906.82</td>
<td>883.4</td>
<td>923.57</td>
<td>875.63</td>
<td>858.2</td>
<td>849.57</td>
<td>844.17</td>
<td>866.7</td>
<td>944.95</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>936.49</td>
<td>943.12</td>
<td>943.57</td>
<td>905.5</td>
<td>884.39</td>
<td>871.79</td>
<td>858.25</td>
<td>885.32</td>
<td>964.82</td>
</tr>
<tr>
<td>geom. mean</td>
<td>921.55</td>
<td>912.83</td>
<td>933.52</td>
<td>890.46</td>
<td>871.21</td>
<td>860.62</td>
<td>851.18</td>
<td>875.97</td>
<td>954.84</td>
</tr>
<tr>
<td>median</td>
<td>915.92</td>
<td>923.52</td>
<td>932.78</td>
<td>887.21</td>
<td>868.0</td>
<td>856.5</td>
<td>849.79</td>
<td>875.44</td>
<td>951.41</td>
</tr>
<tr>
<td>first quartile</td>
<td>913.03</td>
<td>908.07</td>
<td>926.6</td>
<td>879.39</td>
<td>861.39</td>
<td>853.77</td>
<td>848.28</td>
<td>874.98</td>
<td>950.81</td>
</tr>
<tr>
<td>third quartile</td>
<td>922.63</td>
<td>924.98</td>
<td>937.89</td>
<td>897.31</td>
<td>875.43</td>
<td>863.5</td>
<td>853.49</td>
<td>877.18</td>
<td>955.98</td>
</tr>
<tr>
<td>minimum</td>
<td>908.72</td>
<td>862.96</td>
<td>921.76</td>
<td>874.84</td>
<td>858.69</td>
<td>850.07</td>
<td>842.24</td>
<td>862.47</td>
<td>944.26</td>
</tr>
<tr>
<td>maximum</td>
<td>947.98</td>
<td>946.79</td>
<td>948.82</td>
<td>914.08</td>
<td>892.97</td>
<td>879.58</td>
<td>862.24</td>
<td>889.98</td>
<td>971.96</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>65536</td><td>1089.75</td><td>1087.86</td><td>1094.91</td><td>1047.95</td><td>1018.66</td><td>993.19</td><td>982.2</td><td>998.3</td><td>1066.79</td></tr>
<tr><td>65536</td><td>1087.9</td><td>1092.21</td><td>1086.26</td><td>1033.09</td><td>1002.07</td><td>995.89</td><td>965.53</td><td>989.83</td><td>1067.2</td></tr>
<tr><td>65536</td><td>1079.07</td><td>1089.64</td><td>1091.85</td><td>1046.08</td><td>1015.6</td><td>1001.41</td><td>979.51</td><td>1001.94</td><td>1078.71</td></tr>
<tr><td>65536</td><td>1070.7</td><td>1084.56</td><td>1085.44</td><td>1033.61</td><td>1006.38</td><td>991.91</td><td>963.14</td><td>985.16</td><td>1068.25</td></tr>
<tr><td>65536</td><td>1085.44</td><td>1077.46</td><td>1095.93</td><td>1033.32</td><td>1004.2</td><td>993.99</td><td>972.33</td><td>992.71</td><td>1065.58</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1082.57</td>
<td>1086.34</td>
<td>1090.88</td>
<td>1038.81</td>
<td>1009.38</td>
<td>995.28</td>
<td>972.54</td>
<td>993.59</td>
<td>1069.31</td>
</tr>
<tr>
<td>standard dev.</td>
<td>7.77</td>
<td>5.69</td>
<td>4.84</td>
<td>7.52</td>
<td>7.31</td>
<td>3.72</td>
<td>8.36</td>
<td>6.67</td>
<td>5.34</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1075.17</td>
<td>1080.92</td>
<td>1086.27</td>
<td>1031.64</td>
<td>1002.41</td>
<td>991.73</td>
<td>964.57</td>
<td>987.23</td>
<td>1064.21</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1089.98</td>
<td>1091.77</td>
<td>1095.49</td>
<td>1045.98</td>
<td>1016.36</td>
<td>998.82</td>
<td>980.51</td>
<td>999.94</td>
<td>1074.4</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1082.55</td>
<td>1086.33</td>
<td>1090.87</td>
<td>1038.79</td>
<td>1009.36</td>
<td>995.27</td>
<td>972.51</td>
<td>993.57</td>
<td>1069.3</td>
</tr>
<tr>
<td>median</td>
<td>1085.44</td>
<td>1087.86</td>
<td>1091.85</td>
<td>1033.61</td>
<td>1006.38</td>
<td>993.99</td>
<td>972.33</td>
<td>992.71</td>
<td>1067.2</td>
</tr>
<tr>
<td>first quartile</td>
<td>1079.07</td>
<td>1084.56</td>
<td>1086.26</td>
<td>1033.32</td>
<td>1004.2</td>
<td>993.19</td>
<td>965.53</td>
<td>989.83</td>
<td>1066.79</td>
</tr>
<tr>
<td>third quartile</td>
<td>1087.9</td>
<td>1089.64</td>
<td>1094.91</td>
<td>1046.08</td>
<td>1015.6</td>
<td>995.89</td>
<td>979.51</td>
<td>998.3</td>
<td>1068.25</td>
</tr>
<tr>
<td>minimum</td>
<td>1070.7</td>
<td>1077.46</td>
<td>1085.44</td>
<td>1033.09</td>
<td>1002.07</td>
<td>991.91</td>
<td>963.14</td>
<td>985.16</td>
<td>1065.58</td>
</tr>
<tr>
<td>maximum</td>
<td>1089.75</td>
<td>1092.21</td>
<td>1095.93</td>
<td>1047.95</td>
<td>1018.66</td>
<td>1001.41</td>
<td>982.2</td>
<td>1001.94</td>
<td>1078.71</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>17.46 % </td>
<td>18.95 % </td>
<td>16.85 % </td>
<td>16.65 % </td>
<td>15.85 % </td>
<td>15.64 % </td>
<td>14.25 % </td>
<td>13.42 % </td>
<td>11.98 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="131072"></a> 
<img src="131072.png" alt="131072" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>131072</td><td>951.73</td><td>999.01</td><td>945.35</td><td>936.35</td><td>881.57</td><td>865.24</td><td>899.5</td><td>861.3</td><td>898.22</td></tr>
<tr><td>131072</td><td>940.88</td><td>936.71</td><td>930.11</td><td>921.33</td><td>941.52</td><td>855.56</td><td>931.38</td><td>845.89</td><td>883.18</td></tr>
<tr><td>131072</td><td>985.5</td><td>929.33</td><td>915.93</td><td>900.01</td><td>866.14</td><td>847.16</td><td>837.33</td><td>848.15</td><td>866.04</td></tr>
<tr><td>131072</td><td>923.19</td><td>911.58</td><td>922.4</td><td>889.69</td><td>864.87</td><td>849.18</td><td>834.1</td><td>900.25</td><td>876.17</td></tr>
<tr><td>131072</td><td>1029.44</td><td>1029.34</td><td>1004.35</td><td>882.83</td><td>878.93</td><td>845.32</td><td>831.85</td><td>840.52</td><td>878.05</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>966.15</td>
<td>961.19</td>
<td>943.63</td>
<td>906.04</td>
<td>886.61</td>
<td>852.49</td>
<td>866.83</td>
<td>859.22</td>
<td>880.33</td>
</tr>
<tr>
<td>standard dev.</td>
<td>42.05</td>
<td>50.37</td>
<td>35.67</td>
<td>22.33</td>
<td>31.59</td>
<td>8.11</td>
<td>45.82</td>
<td>24.17</td>
<td>11.78</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>926.06</td>
<td>913.17</td>
<td>909.61</td>
<td>884.75</td>
<td>856.49</td>
<td>844.76</td>
<td>823.15</td>
<td>836.18</td>
<td>869.1</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1006.24</td>
<td>1009.22</td>
<td>977.64</td>
<td>927.33</td>
<td>916.72</td>
<td>860.22</td>
<td>910.52</td>
<td>882.27</td>
<td>891.56</td>
</tr>
<tr>
<td>geom. mean</td>
<td>965.43</td>
<td>960.15</td>
<td>943.1</td>
<td>905.82</td>
<td>886.17</td>
<td>852.46</td>
<td>865.88</td>
<td>858.96</td>
<td>880.27</td>
</tr>
<tr>
<td>median</td>
<td>951.73</td>
<td>936.71</td>
<td>930.11</td>
<td>900.01</td>
<td>878.93</td>
<td>849.18</td>
<td>837.33</td>
<td>848.15</td>
<td>878.05</td>
</tr>
<tr>
<td>first quartile</td>
<td>940.88</td>
<td>929.33</td>
<td>922.4</td>
<td>889.69</td>
<td>866.14</td>
<td>847.16</td>
<td>834.1</td>
<td>845.89</td>
<td>876.17</td>
</tr>
<tr>
<td>third quartile</td>
<td>985.5</td>
<td>999.01</td>
<td>945.35</td>
<td>921.33</td>
<td>881.57</td>
<td>855.56</td>
<td>899.5</td>
<td>861.3</td>
<td>883.18</td>
</tr>
<tr>
<td>minimum</td>
<td>923.19</td>
<td>911.58</td>
<td>915.93</td>
<td>882.83</td>
<td>864.87</td>
<td>845.32</td>
<td>831.85</td>
<td>840.52</td>
<td>866.04</td>
</tr>
<tr>
<td>maximum</td>
<td>1029.44</td>
<td>1029.34</td>
<td>1004.35</td>
<td>936.35</td>
<td>941.52</td>
<td>865.24</td>
<td>931.38</td>
<td>900.25</td>
<td>898.22</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>131072</td><td>1098.96</td><td>1090.65</td><td>1107.68</td><td>1046.2</td><td>1015.12</td><td>996.9</td><td>960.85</td><td>960.12</td><td>1009.73</td></tr>
<tr><td>131072</td><td>1086.72</td><td>1089.38</td><td>1090.72</td><td>1050.33</td><td>994.68</td><td>982.83</td><td>948.4</td><td>960.6</td><td>992.55</td></tr>
<tr><td>131072</td><td>1088.03</td><td>1101.19</td><td>1105.49</td><td>1047.92</td><td>1008.77</td><td>991.57</td><td>964.45</td><td>971.79</td><td>1007.41</td></tr>
<tr><td>131072</td><td>1081.51</td><td>1086.37</td><td>1101.64</td><td>1039.95</td><td>1007.83</td><td>987.96</td><td>959.24</td><td>960.16</td><td>995.94</td></tr>
<tr><td>131072</td><td>1089.7</td><td>1092.51</td><td>1100.51</td><td>1042.93</td><td>1010.17</td><td>978.15</td><td>960.84</td><td>959.27</td><td>997.93</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1088.98</td>
<td>1092.02</td>
<td>1101.21</td>
<td>1045.47</td>
<td>1007.32</td>
<td>987.48</td>
<td>958.75</td>
<td>962.39</td>
<td>1000.71</td>
</tr>
<tr>
<td>standard dev.</td>
<td>6.37</td>
<td>5.59</td>
<td>6.53</td>
<td>4.1</td>
<td>7.6</td>
<td>7.32</td>
<td>6.09</td>
<td>5.28</td>
<td>7.47</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1082.91</td>
<td>1086.69</td>
<td>1094.98</td>
<td>1041.56</td>
<td>1000.07</td>
<td>980.5</td>
<td>952.94</td>
<td>957.36</td>
<td>993.59</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1095.05</td>
<td>1097.35</td>
<td>1107.44</td>
<td>1049.37</td>
<td>1014.56</td>
<td>994.46</td>
<td>964.57</td>
<td>967.42</td>
<td>1007.83</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1088.97</td>
<td>1092.01</td>
<td>1101.19</td>
<td>1045.46</td>
<td>1007.29</td>
<td>987.46</td>
<td>958.74</td>
<td>962.38</td>
<td>1000.69</td>
</tr>
<tr>
<td>median</td>
<td>1088.03</td>
<td>1090.65</td>
<td>1101.64</td>
<td>1046.2</td>
<td>1008.77</td>
<td>987.96</td>
<td>960.84</td>
<td>960.16</td>
<td>997.93</td>
</tr>
<tr>
<td>first quartile</td>
<td>1086.72</td>
<td>1089.38</td>
<td>1100.51</td>
<td>1042.93</td>
<td>1007.83</td>
<td>982.83</td>
<td>959.24</td>
<td>960.12</td>
<td>995.94</td>
</tr>
<tr>
<td>third quartile</td>
<td>1089.7</td>
<td>1092.51</td>
<td>1105.49</td>
<td>1047.92</td>
<td>1010.17</td>
<td>991.57</td>
<td>960.85</td>
<td>960.6</td>
<td>1007.41</td>
</tr>
<tr>
<td>minimum</td>
<td>1081.51</td>
<td>1086.37</td>
<td>1090.72</td>
<td>1039.95</td>
<td>994.68</td>
<td>978.15</td>
<td>948.4</td>
<td>959.27</td>
<td>992.55</td>
</tr>
<tr>
<td>maximum</td>
<td>1098.96</td>
<td>1101.19</td>
<td>1107.68</td>
<td>1050.33</td>
<td>1015.12</td>
<td>996.9</td>
<td>964.45</td>
<td>971.79</td>
<td>1009.73</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>12.71 % </td>
<td>13.61 % </td>
<td>16.7 % </td>
<td>15.39 % </td>
<td>13.61 % </td>
<td>15.83 % </td>
<td>10.6 % </td>
<td>12.01 % </td>
<td>13.67 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0002</td>
<td>0.0004</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0021</td>
<td>0.0</td>
<td>0.0</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="262144"></a> 
<img src="262144.png" alt="262144" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>262144</td><td>1254.86</td><td>1275.13</td><td>1320.98</td><td>1122.58</td><td>1038.93</td><td>1023.57</td><td>1063.63</td><td>1108.51</td><td>928.05</td></tr>
<tr><td>262144</td><td>1128.08</td><td>1263.54</td><td>1380.17</td><td>1118.04</td><td>1139.02</td><td>988.7</td><td>1039.32</td><td>954.8</td><td>921.63</td></tr>
<tr><td>262144</td><td>1271.84</td><td>1086.52</td><td>1307.37</td><td>1226.42</td><td>1052.13</td><td>1030.7</td><td>1065.59</td><td>1109.47</td><td>1041.38</td></tr>
<tr><td>262144</td><td>1250.21</td><td>1356.24</td><td>1104.71</td><td>1180.84</td><td>1185.23</td><td>977.99</td><td>971.88</td><td>973.66</td><td>1180.16</td></tr>
<tr><td>262144</td><td>1136.21</td><td>1107.81</td><td>1227.34</td><td>1141.98</td><td>1180.71</td><td>1081.75</td><td>1013.22</td><td>942.31</td><td>952.65</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1208.24</td>
<td>1217.85</td>
<td>1268.11</td>
<td>1157.97</td>
<td>1119.2</td>
<td>1020.54</td>
<td>1030.73</td>
<td>1017.75</td>
<td>1004.78</td>
</tr>
<tr>
<td>standard dev.</td>
<td>69.99</td>
<td>116.06</td>
<td>106.36</td>
<td>45.58</td>
<td>69.78</td>
<td>40.88</td>
<td>39.18</td>
<td>84.04</td>
<td>109.11</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1141.51</td>
<td>1107.2</td>
<td>1166.71</td>
<td>1114.52</td>
<td>1052.67</td>
<td>981.57</td>
<td>993.37</td>
<td>937.63</td>
<td>900.76</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1274.97</td>
<td>1328.5</td>
<td>1369.52</td>
<td>1201.43</td>
<td>1185.73</td>
<td>1059.52</td>
<td>1068.08</td>
<td>1097.87</td>
<td>1108.8</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1206.6</td>
<td>1213.38</td>
<td>1264.41</td>
<td>1157.27</td>
<td>1117.44</td>
<td>1019.9</td>
<td>1030.12</td>
<td>1015.02</td>
<td>1000.28</td>
</tr>
<tr>
<td>median</td>
<td>1250.21</td>
<td>1263.54</td>
<td>1307.37</td>
<td>1141.98</td>
<td>1139.02</td>
<td>1023.57</td>
<td>1039.32</td>
<td>973.66</td>
<td>952.65</td>
</tr>
<tr>
<td>first quartile</td>
<td>1136.21</td>
<td>1107.81</td>
<td>1227.34</td>
<td>1122.58</td>
<td>1052.13</td>
<td>988.7</td>
<td>1013.22</td>
<td>954.8</td>
<td>928.05</td>
</tr>
<tr>
<td>third quartile</td>
<td>1254.86</td>
<td>1275.13</td>
<td>1320.98</td>
<td>1180.84</td>
<td>1180.71</td>
<td>1030.7</td>
<td>1063.63</td>
<td>1108.51</td>
<td>1041.38</td>
</tr>
<tr>
<td>minimum</td>
<td>1128.08</td>
<td>1086.52</td>
<td>1104.71</td>
<td>1118.04</td>
<td>1038.93</td>
<td>977.99</td>
<td>971.88</td>
<td>942.31</td>
<td>921.63</td>
</tr>
<tr>
<td>maximum</td>
<td>1271.84</td>
<td>1356.24</td>
<td>1380.17</td>
<td>1226.42</td>
<td>1185.23</td>
<td>1081.75</td>
<td>1065.59</td>
<td>1109.47</td>
<td>1180.16</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>262144</td><td>1272.71</td><td>1100.22</td><td>1329.36</td><td>1342.79</td><td>1214.1</td><td>1047.23</td><td>1106.17</td><td>994.97</td><td>1265.36</td></tr>
<tr><td>262144</td><td>1373.54</td><td>1154.94</td><td>1199.51</td><td>1062.38</td><td>1197.46</td><td>1092.2</td><td>1056.01</td><td>996.36</td><td>1272.24</td></tr>
<tr><td>262144</td><td>1146.72</td><td>1194.8</td><td>1200.17</td><td>1056.69</td><td>1261.26</td><td>1079.94</td><td>1134.72</td><td>1010.55</td><td>1283.17</td></tr>
<tr><td>262144</td><td>1310.88</td><td>1166.53</td><td>1150.58</td><td>1075.56</td><td>1245.88</td><td>1125.18</td><td>1149.85</td><td>1066.24</td><td>1000.75</td></tr>
<tr><td>262144</td><td>1259.13</td><td>1181.93</td><td>1175.3</td><td>1070.01</td><td>1259.88</td><td>1092.3</td><td>1019.75</td><td>1074.39</td><td>1263.75</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1272.6</td>
<td>1159.68</td>
<td>1210.98</td>
<td>1121.49</td>
<td>1235.72</td>
<td>1087.37</td>
<td>1093.3</td>
<td>1028.5</td>
<td>1217.05</td>
</tr>
<tr>
<td>standard dev.</td>
<td>83.19</td>
<td>36.52</td>
<td>69.25</td>
<td>123.92</td>
<td>28.59</td>
<td>28.03</td>
<td>54.5</td>
<td>38.76</td>
<td>121.16</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1193.28</td>
<td>1124.87</td>
<td>1144.96</td>
<td>1003.34</td>
<td>1208.45</td>
<td>1060.64</td>
<td>1041.34</td>
<td>991.55</td>
<td>1101.54</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1351.91</td>
<td>1194.5</td>
<td>1277.01</td>
<td>1239.63</td>
<td>1262.98</td>
<td>1114.1</td>
<td>1145.26</td>
<td>1065.46</td>
<td>1332.57</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1270.38</td>
<td>1159.22</td>
<td>1209.46</td>
<td>1116.48</td>
<td>1235.45</td>
<td>1087.08</td>
<td>1092.2</td>
<td>1027.92</td>
<td>1211.74</td>
</tr>
<tr>
<td>median</td>
<td>1272.71</td>
<td>1166.53</td>
<td>1199.51</td>
<td>1070.01</td>
<td>1245.88</td>
<td>1092.2</td>
<td>1106.17</td>
<td>1010.55</td>
<td>1265.36</td>
</tr>
<tr>
<td>first quartile</td>
<td>1259.13</td>
<td>1154.94</td>
<td>1175.3</td>
<td>1062.38</td>
<td>1214.1</td>
<td>1079.94</td>
<td>1056.01</td>
<td>996.36</td>
<td>1263.75</td>
</tr>
<tr>
<td>third quartile</td>
<td>1310.88</td>
<td>1181.93</td>
<td>1200.17</td>
<td>1075.56</td>
<td>1259.88</td>
<td>1092.3</td>
<td>1134.72</td>
<td>1066.24</td>
<td>1272.24</td>
</tr>
<tr>
<td>minimum</td>
<td>1146.72</td>
<td>1100.22</td>
<td>1150.58</td>
<td>1056.69</td>
<td>1197.46</td>
<td>1047.23</td>
<td>1019.75</td>
<td>994.97</td>
<td>1000.75</td>
</tr>
<tr>
<td>maximum</td>
<td>1373.54</td>
<td>1194.8</td>
<td>1329.36</td>
<td>1342.79</td>
<td>1261.26</td>
<td>1125.18</td>
<td>1149.85</td>
<td>1074.39</td>
<td>1283.17</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>5.33 % </td>
<td>-4.78 % </td>
<td>-4.51 % </td>
<td>-3.15 % </td>
<td>10.41 % </td>
<td>6.55 % </td>
<td>6.07 % </td>
<td>1.06 % </td>
<td>21.13 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.2222</td>
<td>0.3163</td>
<td>0.3436</td>
<td>0.5538</td>
<td>0.0086</td>
<td>0.0167</td>
<td>0.0706</td>
<td>0.8016</td>
<td>0.0196</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>SAME</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>SAME</td>
<td>DIFF</td>
</tr>
</table>
<a name="524288"></a> 
<img src="524288.png" alt="524288" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>524288</td><td>1401.46</td><td>1339.5</td><td>1410.13</td><td>1257.32</td><td>1203.81</td><td>1124.94</td><td>1082.17</td><td>1089.71</td><td>1166.09</td></tr>
<tr><td>524288</td><td>1362.7</td><td>1240.52</td><td>1300.32</td><td>1265.66</td><td>1250.72</td><td>1114.87</td><td>1097.01</td><td>1113.03</td><td>1083.73</td></tr>
<tr><td>524288</td><td>1308.21</td><td>1325.9</td><td>1239.42</td><td>1221.57</td><td>1200.57</td><td>1130.48</td><td>1092.64</td><td>1021.99</td><td>1099.48</td></tr>
<tr><td>524288</td><td>1349.0</td><td>1285.22</td><td>1240.58</td><td>1317.59</td><td>1127.07</td><td>1053.4</td><td>1080.36</td><td>1147.3</td><td>1038.83</td></tr>
<tr><td>524288</td><td>1388.9</td><td>1234.27</td><td>1207.23</td><td>1221.04</td><td>1164.3</td><td>1086.61</td><td>1105.63</td><td>1089.4</td><td>1032.45</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1362.05</td>
<td>1285.08</td>
<td>1279.53</td>
<td>1256.64</td>
<td>1189.29</td>
<td>1102.06</td>
<td>1091.56</td>
<td>1092.29</td>
<td>1084.12</td>
</tr>
<tr>
<td>standard dev.</td>
<td>36.55</td>
<td>47.95</td>
<td>80.38</td>
<td>39.67</td>
<td>46.39</td>
<td>32.02</td>
<td>10.52</td>
<td>45.86</td>
<td>54.03</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1327.21</td>
<td>1239.37</td>
<td>1202.9</td>
<td>1218.82</td>
<td>1145.07</td>
<td>1071.53</td>
<td>1081.54</td>
<td>1048.56</td>
<td>1032.61</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1396.9</td>
<td>1330.79</td>
<td>1356.16</td>
<td>1294.46</td>
<td>1233.52</td>
<td>1132.59</td>
<td>1101.59</td>
<td>1136.01</td>
<td>1135.63</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1361.66</td>
<td>1284.37</td>
<td>1277.58</td>
<td>1256.14</td>
<td>1188.57</td>
<td>1101.68</td>
<td>1091.52</td>
<td>1091.51</td>
<td>1083.06</td>
</tr>
<tr>
<td>median</td>
<td>1362.7</td>
<td>1285.22</td>
<td>1240.58</td>
<td>1257.32</td>
<td>1200.57</td>
<td>1114.87</td>
<td>1092.64</td>
<td>1089.71</td>
<td>1083.73</td>
</tr>
<tr>
<td>first quartile</td>
<td>1349.0</td>
<td>1240.52</td>
<td>1239.42</td>
<td>1221.57</td>
<td>1164.3</td>
<td>1086.61</td>
<td>1082.17</td>
<td>1089.4</td>
<td>1038.83</td>
</tr>
<tr>
<td>third quartile</td>
<td>1388.9</td>
<td>1325.9</td>
<td>1300.32</td>
<td>1265.66</td>
<td>1203.81</td>
<td>1124.94</td>
<td>1097.01</td>
<td>1113.03</td>
<td>1099.48</td>
</tr>
<tr>
<td>minimum</td>
<td>1308.21</td>
<td>1234.27</td>
<td>1207.23</td>
<td>1221.04</td>
<td>1127.07</td>
<td>1053.4</td>
<td>1080.36</td>
<td>1021.99</td>
<td>1032.45</td>
</tr>
<tr>
<td>maximum</td>
<td>1401.46</td>
<td>1339.5</td>
<td>1410.13</td>
<td>1317.59</td>
<td>1250.72</td>
<td>1130.48</td>
<td>1105.63</td>
<td>1147.3</td>
<td>1166.09</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>524288</td><td>1466.49</td><td>1414.71</td><td>1500.5</td><td>1443.03</td><td>1285.78</td><td>1268.99</td><td>1147.68</td><td>1125.95</td><td>1144.35</td></tr>
<tr><td>524288</td><td>1583.46</td><td>1555.26</td><td>1543.86</td><td>1272.79</td><td>1278.67</td><td>1285.57</td><td>1224.8</td><td>1188.47</td><td>1185.35</td></tr>
<tr><td>524288</td><td>1553.88</td><td>1512.42</td><td>1572.73</td><td>1346.24</td><td>1334.62</td><td>1243.95</td><td>1152.03</td><td>1185.63</td><td>1150.6</td></tr>
<tr><td>524288</td><td>1421.24</td><td>1577.08</td><td>1461.04</td><td>1326.36</td><td>1257.44</td><td>1233.48</td><td>1141.71</td><td>1195.41</td><td>1179.03</td></tr>
<tr><td>524288</td><td>1425.69</td><td>1409.16</td><td>1353.91</td><td>1312.73</td><td>1324.91</td><td>1300.17</td><td>1144.98</td><td>1170.34</td><td>1149.77</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1490.15</td>
<td>1493.72</td>
<td>1486.41</td>
<td>1340.23</td>
<td>1296.29</td>
<td>1266.43</td>
<td>1162.24</td>
<td>1173.16</td>
<td>1161.82</td>
</tr>
<tr>
<td>standard dev.</td>
<td>74.55</td>
<td>78.23</td>
<td>85.37</td>
<td>63.44</td>
<td>32.47</td>
<td>27.85</td>
<td>35.18</td>
<td>27.94</td>
<td>18.88</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1419.08</td>
<td>1419.14</td>
<td>1405.02</td>
<td>1279.74</td>
<td>1265.32</td>
<td>1239.88</td>
<td>1128.71</td>
<td>1146.52</td>
<td>1143.82</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1561.23</td>
<td>1568.31</td>
<td>1567.79</td>
<td>1400.71</td>
<td>1327.25</td>
<td>1292.98</td>
<td>1195.78</td>
<td>1199.79</td>
<td>1179.82</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1488.67</td>
<td>1492.08</td>
<td>1484.4</td>
<td>1339.05</td>
<td>1295.96</td>
<td>1266.19</td>
<td>1161.83</td>
<td>1172.89</td>
<td>1161.7</td>
</tr>
<tr>
<td>median</td>
<td>1466.49</td>
<td>1512.42</td>
<td>1500.5</td>
<td>1326.36</td>
<td>1285.78</td>
<td>1268.99</td>
<td>1147.68</td>
<td>1185.63</td>
<td>1150.6</td>
</tr>
<tr>
<td>first quartile</td>
<td>1425.69</td>
<td>1414.71</td>
<td>1461.04</td>
<td>1312.73</td>
<td>1278.67</td>
<td>1243.95</td>
<td>1144.98</td>
<td>1170.34</td>
<td>1149.77</td>
</tr>
<tr>
<td>third quartile</td>
<td>1553.88</td>
<td>1555.26</td>
<td>1543.86</td>
<td>1346.24</td>
<td>1324.91</td>
<td>1285.57</td>
<td>1152.03</td>
<td>1188.47</td>
<td>1179.03</td>
</tr>
<tr>
<td>minimum</td>
<td>1421.24</td>
<td>1409.16</td>
<td>1353.91</td>
<td>1272.79</td>
<td>1257.44</td>
<td>1233.48</td>
<td>1141.71</td>
<td>1125.95</td>
<td>1144.35</td>
</tr>
<tr>
<td>maximum</td>
<td>1583.46</td>
<td>1577.08</td>
<td>1572.73</td>
<td>1443.03</td>
<td>1334.62</td>
<td>1300.17</td>
<td>1224.8</td>
<td>1195.41</td>
<td>1185.35</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>9.4 % </td>
<td>16.24 % </td>
<td>16.17 % </td>
<td>6.65 % </td>
<td>9.0 % </td>
<td>14.91 % </td>
<td>6.48 % </td>
<td>7.4 % </td>
<td>7.17 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0087</td>
<td>0.0009</td>
<td>0.0043</td>
<td>0.0371</td>
<td>0.0029</td>
<td>0.0</td>
<td>0.0026</td>
<td>0.0098</td>
<td>0.0162</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="1048576"></a> 
<img src="1048576.png" alt="1048576" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>1048576</td><td>1413.75</td><td>1507.63</td><td>1602.47</td><td>1372.82</td><td>1267.57</td><td>1252.18</td><td>1182.56</td><td>1125.93</td><td>1214.04</td></tr>
<tr><td>1048576</td><td>1425.88</td><td>1454.21</td><td>1495.25</td><td>1320.61</td><td>1270.34</td><td>1313.08</td><td>1146.05</td><td>1181.88</td><td>1171.65</td></tr>
<tr><td>1048576</td><td>1488.77</td><td>1427.95</td><td>1489.17</td><td>1324.59</td><td>1392.69</td><td>1224.08</td><td>1143.63</td><td>1196.77</td><td>1174.87</td></tr>
<tr><td>1048576</td><td>1428.21</td><td>1537.26</td><td>1586.07</td><td>1469.77</td><td>1316.73</td><td>1213.27</td><td>1183.04</td><td>1148.17</td><td>1123.82</td></tr>
<tr><td>1048576</td><td>1412.11</td><td>1458.42</td><td>1395.3</td><td>1335.93</td><td>1232.6</td><td>1220.66</td><td>1189.88</td><td>1118.86</td><td>1121.01</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1433.74</td>
<td>1477.09</td>
<td>1513.65</td>
<td>1364.74</td>
<td>1295.99</td>
<td>1244.65</td>
<td>1169.03</td>
<td>1154.32</td>
<td>1161.08</td>
</tr>
<tr>
<td>standard dev.</td>
<td>31.58</td>
<td>44.28</td>
<td>83.78</td>
<td>62.22</td>
<td>61.77</td>
<td>40.99</td>
<td>22.29</td>
<td>34.14</td>
<td>39.05</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1403.64</td>
<td>1434.88</td>
<td>1433.77</td>
<td>1305.42</td>
<td>1237.09</td>
<td>1205.57</td>
<td>1147.78</td>
<td>1121.77</td>
<td>1123.84</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1463.85</td>
<td>1519.31</td>
<td>1593.53</td>
<td>1424.06</td>
<td>1354.88</td>
<td>1283.74</td>
<td>1190.28</td>
<td>1186.87</td>
<td>1198.31</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1433.47</td>
<td>1476.57</td>
<td>1511.78</td>
<td>1363.64</td>
<td>1294.83</td>
<td>1244.12</td>
<td>1168.86</td>
<td>1153.92</td>
<td>1160.55</td>
</tr>
<tr>
<td>median</td>
<td>1425.88</td>
<td>1458.42</td>
<td>1495.25</td>
<td>1335.93</td>
<td>1270.34</td>
<td>1224.08</td>
<td>1182.56</td>
<td>1148.17</td>
<td>1171.65</td>
</tr>
<tr>
<td>first quartile</td>
<td>1413.75</td>
<td>1454.21</td>
<td>1489.17</td>
<td>1324.59</td>
<td>1267.57</td>
<td>1220.66</td>
<td>1146.05</td>
<td>1125.93</td>
<td>1123.82</td>
</tr>
<tr>
<td>third quartile</td>
<td>1428.21</td>
<td>1507.63</td>
<td>1586.07</td>
<td>1372.82</td>
<td>1316.73</td>
<td>1252.18</td>
<td>1183.04</td>
<td>1181.88</td>
<td>1174.87</td>
</tr>
<tr>
<td>minimum</td>
<td>1412.11</td>
<td>1427.95</td>
<td>1395.3</td>
<td>1320.61</td>
<td>1232.6</td>
<td>1213.27</td>
<td>1143.63</td>
<td>1118.86</td>
<td>1121.01</td>
</tr>
<tr>
<td>maximum</td>
<td>1488.77</td>
<td>1537.26</td>
<td>1602.47</td>
<td>1469.77</td>
<td>1392.69</td>
<td>1313.08</td>
<td>1189.88</td>
<td>1196.77</td>
<td>1214.04</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>1048576</td><td>1731.2</td><td>1706.34</td><td>1709.55</td><td>1455.55</td><td>1379.04</td><td>1346.09</td><td>1246.29</td><td>1224.0</td><td>1266.7</td></tr>
<tr><td>1048576</td><td>1640.67</td><td>1621.7</td><td>1675.53</td><td>1521.48</td><td>1450.21</td><td>1340.68</td><td>1258.58</td><td>1235.76</td><td>1251.13</td></tr>
<tr><td>1048576</td><td>1727.98</td><td>1582.04</td><td>1640.11</td><td>1528.02</td><td>1433.51</td><td>1325.09</td><td>1278.52</td><td>1276.4</td><td>1250.5</td></tr>
<tr><td>1048576</td><td>1710.39</td><td>1607.34</td><td>1742.72</td><td>1473.94</td><td>1419.97</td><td>1317.66</td><td>1281.83</td><td>1242.79</td><td>1216.96</td></tr>
<tr><td>1048576</td><td>1714.33</td><td>1585.54</td><td>1636.5</td><td>1485.78</td><td>1389.77</td><td>1324.69</td><td>1255.36</td><td>1229.4</td><td>1235.41</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1704.91</td>
<td>1620.59</td>
<td>1680.88</td>
<td>1492.95</td>
<td>1414.5</td>
<td>1330.84</td>
<td>1264.11</td>
<td>1241.67</td>
<td>1244.14</td>
</tr>
<tr>
<td>standard dev.</td>
<td>36.98</td>
<td>50.61</td>
<td>45.57</td>
<td>31.05</td>
<td>29.73</td>
<td>11.98</td>
<td>15.38</td>
<td>20.65</td>
<td>18.8</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1669.66</td>
<td>1572.34</td>
<td>1637.43</td>
<td>1463.35</td>
<td>1386.16</td>
<td>1319.42</td>
<td>1249.45</td>
<td>1221.98</td>
<td>1226.22</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1740.17</td>
<td>1668.84</td>
<td>1724.33</td>
<td>1522.55</td>
<td>1442.84</td>
<td>1342.26</td>
<td>1278.78</td>
<td>1261.36</td>
<td>1262.06</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1704.59</td>
<td>1619.97</td>
<td>1680.39</td>
<td>1492.69</td>
<td>1414.25</td>
<td>1330.8</td>
<td>1264.04</td>
<td>1241.53</td>
<td>1244.03</td>
</tr>
<tr>
<td>median</td>
<td>1714.33</td>
<td>1607.34</td>
<td>1675.53</td>
<td>1485.78</td>
<td>1419.97</td>
<td>1325.09</td>
<td>1258.58</td>
<td>1235.76</td>
<td>1250.5</td>
</tr>
<tr>
<td>first quartile</td>
<td>1710.39</td>
<td>1585.54</td>
<td>1640.11</td>
<td>1473.94</td>
<td>1389.77</td>
<td>1324.69</td>
<td>1255.36</td>
<td>1229.4</td>
<td>1235.41</td>
</tr>
<tr>
<td>third quartile</td>
<td>1727.98</td>
<td>1621.7</td>
<td>1709.55</td>
<td>1521.48</td>
<td>1433.51</td>
<td>1340.68</td>
<td>1278.52</td>
<td>1242.79</td>
<td>1251.13</td>
</tr>
<tr>
<td>minimum</td>
<td>1640.67</td>
<td>1582.04</td>
<td>1636.5</td>
<td>1455.55</td>
<td>1379.04</td>
<td>1317.66</td>
<td>1246.29</td>
<td>1224.0</td>
<td>1216.96</td>
</tr>
<tr>
<td>maximum</td>
<td>1731.2</td>
<td>1706.34</td>
<td>1742.72</td>
<td>1528.02</td>
<td>1450.21</td>
<td>1346.09</td>
<td>1281.83</td>
<td>1276.4</td>
<td>1266.7</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>18.91 % </td>
<td>9.71 % </td>
<td>11.05 % </td>
<td>9.39 % </td>
<td>9.14 % </td>
<td>6.92 % </td>
<td>8.13 % </td>
<td>7.57 % </td>
<td>7.15 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0</td>
<td>0.0014</td>
<td>0.0044</td>
<td>0.0033</td>
<td>0.0048</td>
<td>0.002</td>
<td>0.0</td>
<td>0.0012</td>
<td>0.0027</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="2097152"></a> 
<img src="2097152.png" alt="2097152" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>2097152</td><td>1591.81</td><td>1570.09</td><td>1644.89</td><td>1455.17</td><td>1369.34</td><td>1290.78</td><td>1237.77</td><td>1233.91</td><td>1209.71</td></tr>
<tr><td>2097152</td><td>1607.43</td><td>1557.59</td><td>1576.2</td><td>1452.37</td><td>1361.12</td><td>1334.64</td><td>1229.27</td><td>1221.14</td><td>1230.03</td></tr>
<tr><td>2097152</td><td>1584.32</td><td>1561.18</td><td>1626.05</td><td>1418.26</td><td>1376.24</td><td>1318.14</td><td>1241.5</td><td>1220.19</td><td>1211.93</td></tr>
<tr><td>2097152</td><td>1533.49</td><td>1582.26</td><td>1577.71</td><td>1460.96</td><td>1383.51</td><td>1269.39</td><td>1233.07</td><td>1216.91</td><td>1233.62</td></tr>
<tr><td>2097152</td><td>1598.6</td><td>1595.76</td><td>1586.13</td><td>1442.15</td><td>1375.65</td><td>1311.9</td><td>1235.99</td><td>1225.21</td><td>1201.98</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1583.13</td>
<td>1573.37</td>
<td>1602.2</td>
<td>1445.78</td>
<td>1373.17</td>
<td>1304.97</td>
<td>1235.52</td>
<td>1223.47</td>
<td>1217.45</td>
</tr>
<tr>
<td>standard dev.</td>
<td>29.03</td>
<td>15.72</td>
<td>31.33</td>
<td>16.83</td>
<td>8.4</td>
<td>25.34</td>
<td>4.64</td>
<td>6.55</td>
<td>13.68</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1555.45</td>
<td>1558.38</td>
<td>1572.33</td>
<td>1429.74</td>
<td>1365.16</td>
<td>1280.81</td>
<td>1231.1</td>
<td>1217.23</td>
<td>1204.41</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1610.8</td>
<td>1588.36</td>
<td>1632.06</td>
<td>1461.83</td>
<td>1381.19</td>
<td>1329.14</td>
<td>1239.94</td>
<td>1229.71</td>
<td>1230.5</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1582.91</td>
<td>1573.31</td>
<td>1601.95</td>
<td>1445.7</td>
<td>1373.15</td>
<td>1304.77</td>
<td>1235.51</td>
<td>1223.46</td>
<td>1217.39</td>
</tr>
<tr>
<td>median</td>
<td>1591.81</td>
<td>1570.09</td>
<td>1586.13</td>
<td>1452.37</td>
<td>1375.65</td>
<td>1311.9</td>
<td>1235.99</td>
<td>1221.14</td>
<td>1211.93</td>
</tr>
<tr>
<td>first quartile</td>
<td>1584.32</td>
<td>1561.18</td>
<td>1577.71</td>
<td>1442.15</td>
<td>1369.34</td>
<td>1290.78</td>
<td>1233.07</td>
<td>1220.19</td>
<td>1209.71</td>
</tr>
<tr>
<td>third quartile</td>
<td>1598.6</td>
<td>1582.26</td>
<td>1626.05</td>
<td>1455.17</td>
<td>1376.24</td>
<td>1318.14</td>
<td>1237.77</td>
<td>1225.21</td>
<td>1230.03</td>
</tr>
<tr>
<td>minimum</td>
<td>1533.49</td>
<td>1557.59</td>
<td>1576.2</td>
<td>1418.26</td>
<td>1361.12</td>
<td>1269.39</td>
<td>1229.27</td>
<td>1216.91</td>
<td>1201.98</td>
</tr>
<tr>
<td>maximum</td>
<td>1607.43</td>
<td>1595.76</td>
<td>1644.89</td>
<td>1460.96</td>
<td>1383.51</td>
<td>1334.64</td>
<td>1241.5</td>
<td>1233.91</td>
<td>1233.62</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>2097152</td><td>1749.96</td><td>1796.5</td><td>1870.49</td><td>1620.24</td><td>1499.77</td><td>1403.84</td><td>1284.8</td><td>1284.47</td><td>1277.81</td></tr>
<tr><td>2097152</td><td>1722.92</td><td>1802.99</td><td>1822.03</td><td>1597.22</td><td>1485.13</td><td>1410.67</td><td>1299.86</td><td>1289.42</td><td>1304.94</td></tr>
<tr><td>2097152</td><td>1743.52</td><td>1831.32</td><td>1890.14</td><td>1609.57</td><td>1489.6</td><td>1436.5</td><td>1290.85</td><td>1282.11</td><td>1288.92</td></tr>
<tr><td>2097152</td><td>1837.44</td><td>1788.67</td><td>1899.63</td><td>1631.97</td><td>1508.64</td><td>1413.7</td><td>1301.68</td><td>1272.06</td><td>1275.04</td></tr>
<tr><td>2097152</td><td>1820.56</td><td>1838.23</td><td>1912.01</td><td>1607.12</td><td>1491.56</td><td>1427.46</td><td>1297.05</td><td>1277.36</td><td>1274.88</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1774.88</td>
<td>1811.54</td>
<td>1878.86</td>
<td>1613.23</td>
<td>1494.94</td>
<td>1418.44</td>
<td>1294.85</td>
<td>1281.08</td>
<td>1284.32</td>
</tr>
<tr>
<td>standard dev.</td>
<td>50.76</td>
<td>21.95</td>
<td>35.2</td>
<td>13.3</td>
<td>9.32</td>
<td>13.26</td>
<td>6.96</td>
<td>6.66</td>
<td>12.88</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1726.49</td>
<td>1790.62</td>
<td>1845.3</td>
<td>1600.55</td>
<td>1486.06</td>
<td>1405.79</td>
<td>1288.21</td>
<td>1274.74</td>
<td>1272.03</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1823.27</td>
<td>1832.46</td>
<td>1912.42</td>
<td>1625.9</td>
<td>1503.82</td>
<td>1431.08</td>
<td>1301.48</td>
<td>1287.43</td>
<td>1296.6</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1774.3</td>
<td>1811.43</td>
<td>1878.59</td>
<td>1613.18</td>
<td>1494.92</td>
<td>1418.39</td>
<td>1294.83</td>
<td>1281.07</td>
<td>1284.26</td>
</tr>
<tr>
<td>median</td>
<td>1749.96</td>
<td>1802.99</td>
<td>1890.14</td>
<td>1609.57</td>
<td>1491.56</td>
<td>1413.7</td>
<td>1297.05</td>
<td>1282.11</td>
<td>1277.81</td>
</tr>
<tr>
<td>first quartile</td>
<td>1743.52</td>
<td>1796.5</td>
<td>1870.49</td>
<td>1607.12</td>
<td>1489.6</td>
<td>1410.67</td>
<td>1290.85</td>
<td>1277.36</td>
<td>1275.04</td>
</tr>
<tr>
<td>third quartile</td>
<td>1820.56</td>
<td>1831.32</td>
<td>1899.63</td>
<td>1620.24</td>
<td>1499.77</td>
<td>1427.46</td>
<td>1299.86</td>
<td>1284.47</td>
<td>1288.92</td>
</tr>
<tr>
<td>minimum</td>
<td>1722.92</td>
<td>1788.67</td>
<td>1822.03</td>
<td>1597.22</td>
<td>1485.13</td>
<td>1403.84</td>
<td>1284.8</td>
<td>1272.06</td>
<td>1274.88</td>
</tr>
<tr>
<td>maximum</td>
<td>1837.44</td>
<td>1838.23</td>
<td>1912.01</td>
<td>1631.97</td>
<td>1508.64</td>
<td>1436.5</td>
<td>1301.68</td>
<td>1289.42</td>
<td>1304.94</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>12.11 % </td>
<td>15.14 % </td>
<td>17.27 % </td>
<td>11.58 % </td>
<td>8.87 % </td>
<td>8.69 % </td>
<td>4.8 % </td>
<td>4.71 % </td>
<td>5.49 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0001</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>
<a name="4194304"></a> 
<img src="4194304.png" alt="4194304" class="plot"  />
<table>
<tr class="bottomline"><td rowspan="2"/>
<td rowspan="2">File size [kB]</td>
<td colspan="9">Block size [kB]</td>
</tr>
<tr><td>64</td>
<td>128</td>
<td>256</td>
<td>512</td>
<td>1024</td>
<td>2048</td>
<td>4096</td>
<td>8192</td>
<td>16384</td>
</tr>
<tr class="topline"><td rowspan="15">baseline</td><td>4194304</td><td>1531.26</td><td>1549.89</td><td>1547.91</td><td>1398.41</td><td>1310.84</td><td>1277.11</td><td>1172.84</td><td>1173.62</td><td>1194.21</td></tr>
<tr><td>4194304</td><td>1563.64</td><td>1533.37</td><td>1534.57</td><td>1387.99</td><td>1326.31</td><td>1252.33</td><td>1187.46</td><td>1169.57</td><td>1183.64</td></tr>
<tr><td>4194304</td><td>1498.58</td><td>1535.21</td><td>1565.93</td><td>1387.89</td><td>1306.37</td><td>1254.67</td><td>1179.38</td><td>1176.68</td><td>1178.8</td></tr>
<tr><td>4194304</td><td>1532.79</td><td>1540.5</td><td>1546.8</td><td>1390.71</td><td>1311.74</td><td>1267.05</td><td>1179.57</td><td>1178.23</td><td>1176.55</td></tr>
<tr><td>4194304</td><td>1531.4</td><td>1504.41</td><td>1563.31</td><td>1387.14</td><td>1317.15</td><td>1255.25</td><td>1184.48</td><td>1173.92</td><td>1166.4</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1531.54</td>
<td>1532.68</td>
<td>1551.7</td>
<td>1390.43</td>
<td>1314.48</td>
<td>1261.28</td>
<td>1180.75</td>
<td>1174.41</td>
<td>1179.92</td>
</tr>
<tr>
<td>standard dev.</td>
<td>23.01</td>
<td>17.06</td>
<td>12.93</td>
<td>4.66</td>
<td>7.64</td>
<td>10.53</td>
<td>5.59</td>
<td>3.32</td>
<td>10.17</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1509.6</td>
<td>1516.41</td>
<td>1539.37</td>
<td>1385.98</td>
<td>1307.2</td>
<td>1251.24</td>
<td>1175.42</td>
<td>1171.24</td>
<td>1170.23</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1553.47</td>
<td>1548.94</td>
<td>1564.03</td>
<td>1394.87</td>
<td>1321.77</td>
<td>1271.33</td>
<td>1186.07</td>
<td>1177.57</td>
<td>1189.62</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1531.4</td>
<td>1532.6</td>
<td>1551.66</td>
<td>1390.42</td>
<td>1314.47</td>
<td>1261.25</td>
<td>1180.74</td>
<td>1174.4</td>
<td>1179.89</td>
</tr>
<tr>
<td>median</td>
<td>1531.4</td>
<td>1535.21</td>
<td>1547.91</td>
<td>1387.99</td>
<td>1311.74</td>
<td>1255.25</td>
<td>1179.57</td>
<td>1173.92</td>
<td>1178.8</td>
</tr>
<tr>
<td>first quartile</td>
<td>1531.26</td>
<td>1533.37</td>
<td>1546.8</td>
<td>1387.89</td>
<td>1310.84</td>
<td>1254.67</td>
<td>1179.38</td>
<td>1173.62</td>
<td>1176.55</td>
</tr>
<tr>
<td>third quartile</td>
<td>1532.79</td>
<td>1540.5</td>
<td>1563.31</td>
<td>1390.71</td>
<td>1317.15</td>
<td>1267.05</td>
<td>1184.48</td>
<td>1176.68</td>
<td>1183.64</td>
</tr>
<tr>
<td>minimum</td>
<td>1498.58</td>
<td>1504.41</td>
<td>1534.57</td>
<td>1387.14</td>
<td>1306.37</td>
<td>1252.33</td>
<td>1172.84</td>
<td>1169.57</td>
<td>1166.4</td>
</tr>
<tr>
<td>maximum</td>
<td>1563.64</td>
<td>1549.89</td>
<td>1565.93</td>
<td>1398.41</td>
<td>1326.31</td>
<td>1277.11</td>
<td>1187.46</td>
<td>1178.23</td>
<td>1194.21</td>
</tr>
<tr class="topline"><td rowspan="15">set1</td><td>4194304</td><td>1786.3</td><td>1779.08</td><td>1792.87</td><td>1591.84</td><td>1478.31</td><td>1430.35</td><td>1296.62</td><td>1261.94</td><td>1261.57</td></tr>
<tr><td>4194304</td><td>1768.41</td><td>1750.81</td><td>1767.62</td><td>1572.91</td><td>1496.51</td><td>1400.97</td><td>1302.37</td><td>1285.29</td><td>1284.93</td></tr>
<tr><td>4194304</td><td>1803.66</td><td>1781.45</td><td>1785.14</td><td>1593.7</td><td>1493.2</td><td>1403.26</td><td>1298.62</td><td>1285.37</td><td>1293.09</td></tr>
<tr><td>4194304</td><td>1781.37</td><td>1774.39</td><td>1785.22</td><td>1565.81</td><td>1467.46</td><td>1406.74</td><td>1334.5</td><td>1260.42</td><td>1288.05</td></tr>
<tr><td>4194304</td><td>1798.05</td><td>1803.29</td><td>1796.43</td><td>1591.46</td><td>1500.74</td><td>1408.57</td><td>1296.52</td><td>1272.45</td><td>1272.35</td></tr>
<tr class="topline">
<td>mean val.</td>
<td>1787.56</td>
<td>1777.8</td>
<td>1785.46</td>
<td>1583.14</td>
<td>1487.24</td>
<td>1409.98</td>
<td>1305.73</td>
<td>1273.09</td>
<td>1280.0</td>
</tr>
<tr>
<td>standard dev.</td>
<td>13.93</td>
<td>18.74</td>
<td>11.11</td>
<td>12.86</td>
<td>13.92</td>
<td>11.77</td>
<td>16.26</td>
<td>12.09</td>
<td>12.83</td>
</tr>
<tr>
<td>ci. min. 90%</td>
<td>1774.28</td>
<td>1759.94</td>
<td>1774.87</td>
<td>1570.88</td>
<td>1473.98</td>
<td>1398.76</td>
<td>1290.23</td>
<td>1261.56</td>
<td>1267.76</td>
</tr>
<tr>
<td>ci. max 90%</td>
<td>1800.84</td>
<td>1795.67</td>
<td>1796.05</td>
<td>1595.4</td>
<td>1500.51</td>
<td>1421.2</td>
<td>1321.23</td>
<td>1284.62</td>
<td>1292.23</td>
</tr>
<tr>
<td>geom. mean</td>
<td>1787.52</td>
<td>1777.72</td>
<td>1785.43</td>
<td>1583.1</td>
<td>1487.19</td>
<td>1409.94</td>
<td>1305.65</td>
<td>1273.05</td>
<td>1279.95</td>
</tr>
<tr>
<td>median</td>
<td>1786.3</td>
<td>1779.08</td>
<td>1785.22</td>
<td>1591.46</td>
<td>1493.2</td>
<td>1406.74</td>
<td>1298.62</td>
<td>1272.45</td>
<td>1284.93</td>
</tr>
<tr>
<td>first quartile</td>
<td>1781.37</td>
<td>1774.39</td>
<td>1785.14</td>
<td>1572.91</td>
<td>1478.31</td>
<td>1403.26</td>
<td>1296.62</td>
<td>1261.94</td>
<td>1272.35</td>
</tr>
<tr>
<td>third quartile</td>
<td>1798.05</td>
<td>1781.45</td>
<td>1792.87</td>
<td>1591.84</td>
<td>1496.51</td>
<td>1408.57</td>
<td>1302.37</td>
<td>1285.29</td>
<td>1288.05</td>
</tr>
<tr>
<td>minimum</td>
<td>1768.41</td>
<td>1750.81</td>
<td>1767.62</td>
<td>1565.81</td>
<td>1467.46</td>
<td>1400.97</td>
<td>1296.52</td>
<td>1260.42</td>
<td>1261.57</td>
</tr>
<tr>
<td>maximum</td>
<td>1803.66</td>
<td>1803.29</td>
<td>1796.43</td>
<td>1593.7</td>
<td>1500.74</td>
<td>1430.35</td>
<td>1334.5</td>
<td>1285.37</td>
<td>1293.09</td>
</tr>
<tr class="bottomline topline">
<td colspan="2">baseline set1 difference</td>
<td>16.72 % </td>
<td>15.99 % </td>
<td>15.06 % </td>
<td>13.86 % </td>
<td>13.14 % </td>
<td>11.79 % </td>
<td>10.58 % </td>
<td>8.4 % </td>
<td>8.48 % </td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest p-value</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
<td>0.0</td>
</tr>
<tr class="bottomline">
<td colspan="2">ttest equality</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
<td>DIFF</td>
</tr>
</table>

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